Annals of Botany

This Article Abstract FREE Full Text (PDF) Content Snapshot E-letters: Submit a response Alert me when this article is cited Alert me when E-letters are posted Alert me if a correction is posted Services Email this article to a friend Similar articles in this journal Similar articles in ISI Web of Science Similar articles in PubMed Alert me to new issues of the journal Add to My Personal Archive Download to citation manager Search for citing articles in: ISI Web of Science (49) Request Permissions Google Scholar Articles by TUBEROSA, R. Articles by CONTI, S. Search for Related Content PubMed PubMed Citation Articles by TUBEROSA, R. Articles by CONTI, S. Agricola Articles by TUBEROSA, R. Articles by CONTI, S. Social Bookmarking          What's this?

Annals of Botany 89: 941-963, 2002
© 2002 Annals of Botany Company

Mapping QTLs Regulating Morpho-physiological Traits and Yield: Case Studies, Shortcomings and Perspectives in Drought-stressed Maize

ROBERTO TUBEROSA^*,1, SILVIO SALVI¹, MARIA CORINNA SANGUINETI¹, PIERANGELO LANDI¹, MARCO MACCAFERRI¹ and SERGIO CONTI¹

¹Department of Agroenvironmental Science and Technology, University of Bologna,Via Filippo Re 6–8, 40126 Bologna, Italy

* For correspondence. E-mail tuberosa{at}agrsci.unibo.it

Received: 4 July 2001; Returned for revision: 3 January 2002; Accepted: 13 February 2002.

	ABSTRACT

TOP ABSTRACT INTRODUCTION PRINCIPLES OF QTL ANALYSIS QTL ANALYSIS AS A... LITERATURE REVIEW FOR QTLS... ANALYSIS OF THE CO-LOCATION... UNDERSTANDING AND DEALING WITH... ALTERNATIVE APPROACHES TO... FROM QTLS TO GENES FUTURE PERSPECTIVES FOR QTL... CONCLUDING REMARKS LITERATURE CITED

 

Comparative analysis of a number of studies in drought-stressed maize (Zea mays L.) reporting quantitative trait loci (QTLs) for abscisic acid concentration, root characteristics, other morpho-physiological traits (MPTs) and grain yield (GY) reveals their complex genetic basis and the influence of the genetic background and the environment on QTL effects. Chromosome regions (e.g. near umc11 on chromosome 1 and near csu133 on chromosome 2) with QTLs controlling a number of MPTs and GY across populations and conditions of different water supply have been identified. Examples are presented on the use of QTL information to elucidate the genetic and physiological bases of the association among MPTs and GY. The QTL approach allows us to develop hypotheses accounting for these associations which can be further tested by developing near isogenic lines (NILs) differing for the QTL alleles. NILs also allow for a more accurate assessment of the breeding value of MPTs and, in some cases, may allow for the map-based cloning of the gene(s) underlying the QTL. Although QTL analysis is still time-consuming and resource-demanding, its integration with genomics and post-genomics approaches (e.g. transcriptome, proteome and metabolome analyses) will play an increasingly important role for the identification and validation of candidate genes affecting MPTs and GY.

Key words: Review, quantitative trait locus, QTL, drought stress, maize, genomics, ABA, roots, grain yield, near isogenic lines, NILs, Zea mays.

	INTRODUCTION

TOP ABSTRACT INTRODUCTION PRINCIPLES OF QTL ANALYSIS QTL ANALYSIS AS A... LITERATURE REVIEW FOR QTLS... ANALYSIS OF THE CO-LOCATION... UNDERSTANDING AND DEALING WITH... ALTERNATIVE APPROACHES TO... FROM QTLS TO GENES FUTURE PERSPECTIVES FOR QTL... CONCLUDING REMARKS LITERATURE CITED

 
In the past decades, considerable effort has been devoted to investigating the relationships between genetic variation in morpho-physiological traits (MPTs) and adaptation of crop plants to drought conditions (Blum, 1988; Richards, 1988; Ludlow and Muchow, 1990; McDonald and Davies, 1996; Passioura, 1996). More recently, this enduring challenge has laid more emphasis on the effects of drought at the cellular and molecular levels (Bray, 1997; Bajaj et al., 1999; Zhang et al., 2000; Bohnert and Bressan, 2001; Knight and Knight, 2001). Although the wealth of information produced by these studies has considerably enhanced our understanding of how plants can adapt to water-stressed conditions, the improvement in crop performance has seldom benefited from this knowledge. Due to the extremely complex genetic basis of yield, improving and stabilizing crop performance under drought-stressed conditions remains a slow, laborious and mostly empirical process.

Progress in increasing yield and its stability under water-limited conditions through a direct selection has been hampered by the low heritability of yield, particularly under drought, and by its large ‘genotype x environment’ interaction (Blum, 1988; Ceccarelli and Grando, 1996). As an alternative to a direct selection for yield under drought conditions, MPTs genetically correlated with yield have been targeted in selection programmes pursued in collaboration between physiologists and breeders (Crosbie, 1982; Blum, 1988). The successful application of this strategy requires MPTs that are cheap and easy to score, characterized by a high genetic correlation with yield and heritability higher than that of yield. Unfortunately, only a very small number of MPTs meet these prerequisites, which is why only a few ‘success’ stories have so far been reported for enhancing yield under drought by applying an indirect selection for MPTs (Richards, 1996; Ribaut et al., 1997a). Additionally, it remains difficult to identify accessions (genotypes) with as many as possible ‘favourable’ (in terms of effects on yield) alleles at the loci governing the expression of the desired MPT.

The expression of MPTs is usually governed by several loci and thus favourable alleles of all such loci are likely to be dispersed in different combinations in the accessions of each crop. Therefore, even when crossing parental lines carrying the desirable alleles at most of the major loci regulating the targeted MPT, the probability of recovering at least one recombinant genotype carrying favourable alleles at all the major loci for the trait under selection is extremely low. For example, if an F₂ population segregates for ten unlinked and functionally polymorphic genes controlling a particular trait, then more than 2·4 x 10⁶ F₂ plants should be considered to retrieve, at a probability level (P) of 0·90, at least one F₂ plant homozygous for the favourable alleles at all ten loci, according to the formula (1 – (1/4)¹⁰)ⁿ = 0·10, where ‘n’ is the number of plants to be considered. The underlying but clearly unrealistic assumption is the possibility of correctly identifying such genotypes based solely on the phenotype. This goal might possibly be achieved for highly heritable traits (e.g. flowering time) by evaluating in replicated experiments the selfed progenies (e.g. F₃ or, preferably, later generations) of such plants or, for species which can be vegetatively propagated, a number of clones. However, the costs associated with this approach would clearly be prohibitive.

The traditional methods applied to investigate the genetic control of multigenic (quantitative) traits such as MPTs and yield in a segregating population (Falconer, 1981; Hallauer and Miranda Fo, 1988), although valuable, are insufficient to provide us with information on: (1) the chromosome regions regulating the variation of each trait; (2) the simultaneous effects of each chromosome region on other traits and the genetic basis (pleiotropy and/or linkage) of such associated effects; and (3) the interpretation of possible cause–effect relationships among traits. Some of these constraints can now be partially overcome by using molecular markers which not only allow for the identification of the quantitative trait loci (QTLs) controlling the chosen MPT, but also enable us to assess the effects of the same QTL region on other traits (Tanksley, 1993; Prioul et al., 1997) and, more importantly, on yield (Stuber et al., 1987, 1999).

The main objectives of this article are to: (1) summarize the basic principles of QTL analysis; (2) illustrate how QTL analysis can help in elucidating the genetic basis of traits association; (3) review the published information in maize (Zea mays L.) on QTLs for abscisic acid (ABA) concentration and root traits, both of which are involved in the adaptive response of maize to drought; (4) analyse and interpret the co-location of the QTLs for ABA concentration and root traits with QTLs for other MPTs (e.g. anthesis–silking interval, stomatal conductance, etc.) and for grain yield in maize; (5) critically analyse the limitations and future perspectives of QTL analysis; (6) present alternative approaches to uncover the presence of QTLs; and (7) illustrate how QTLs can lead to gene discovery. The current understanding of the breeding value of the MPTs herein considered is good for the anthesis–silking interval only (Bolaños and Edmeades, 1996, 1997; Ribaut et al., 1997a), and is otherwise poor, as in the case of root traits, or even controversial, as in the case of ABA concentration (Blum, 1988; Quarrie, 1993, 1996; Landi et al., 1995, 2001b; Setter, 1997; Sanguineti et al., 1999; Mugo et al., 2000). For the sake of clarity, we will adopt the terminology of Ludlow and Muchow (1990), which distinguishes traits providing drought escape and drought resistance, with the former further subdivided in terms of dehydration avoidance and dehydration tolerance.

	PRINCIPLES OF QTL ANALYSIS

TOP ABSTRACT INTRODUCTION PRINCIPLES OF QTL ANALYSIS QTL ANALYSIS AS A... LITERATURE REVIEW FOR QTLS... ANALYSIS OF THE CO-LOCATION... UNDERSTANDING AND DEALING WITH... ALTERNATIVE APPROACHES TO... FROM QTLS TO GENES FUTURE PERSPECTIVES FOR QTL... CONCLUDING REMARKS LITERATURE CITED

 
The ultimate goals of QTL analysis are to dissect the complex inheritance of quantitative traits into ‘Mendelian-like’ factors amenable to selection through the analysis of the flanking molecular markers and to clone the genes underlying the QTLs. The dissection of a quantitative trait into its discrete genetic components is generally made possible through the production of an experimental population (e.g. F₂ plants, F₃ families, recombinant inbred lines, double haploids, etc.) starting from an F₁ cross between two inbred lines showing genetic variation for the trait(s) of interest (Tanksley, 1993; Lee, 1995; Quarrie, 1996; Prioul et al., 1997). The number of plants or progenies considered for a QTL study usually varies from approx. 100 (Lebreton et al., 1995; Agrama and Moussa, 1996; Guingo et al., 1998; Tuberosa et al., 1998b) to over 400 (Openshaw and Frascaroli, 1997; Melchinger et al., 1998).

Typically, a QTL study includes an accurate phenotypic evaluation of an adequately large mapping population, its molecular profiling and a statistical analysis to test the association between a phenotype and a marker genotype. For most species, an adequate coverage of the genome can be achieved with approx. 100–150 marker loci evenly spaced along the chromosomes. Once a marker density of approx. one marker/20 cM is reached, then it becomes more profitable to increase the number of progenies rather than the number of markers to increase the accuracy of QTL detection (Darvasi et al., 1993).

At its simplest, QTL analysis relies on one-way ANOVA testing whether the phenotypic means of the possible genotype classes at a specific chromosomal position are significantly different. If a significant difference is found, then it can be concluded that a QTL is probably linked to the chromosomal position under investigation. A major limitation of ANOVA is that it does not provide information on the distance of the QTL from the associated marker; furthermore, it may not be possible to ascertain whether the detected effect is due to a minor QTL tightly linked to the marker, or to a major, but more distant, QTL. These limitations can be overcome through the use of statistical approaches based on information of multiple markers which provide greater accuracy for QTL mapping (Martinez and Curnow, 1992; Zeng, 1994; Utz and Melchinger, 1996; Liu, 1998; Kao et al., 1999; Korol et al., 2001; Sen and Churchill, 2001). In this case, a frequently used output-statistic to describe the results is the LOD (logarithm of the odds ratio) score; the LOD value at a particular chromosome position is computed as log₁₀ of the ratio between the chance of a real QTL being present given the effect measured at that position divided by the chance of having a similar effect with no QTL being present. The most likely position of the QTL is thus at the peak of the LOD profile. The graphical output can also provide us with a confidence interval around the QTL peak, thus delineating the range of the most likely QTL position moving away from each side of the peak. To avoid declaring ‘false-positive’ QTLs (i.e. declaring the presence of a QTL when the QTL is absent), the threshold value of the LOD score should be set reasonably high (usually >2·0).

The large volume of literature available on the diverse statistical approaches, experimental designs and other general features of QTL analysis will not be reviewed in detail here because several authors have already thoroughly addressed such aspects (Jansen, 1993; Tanksley, 1993; Jansen and Stam, 1994; Lee, 1995; Beavis, 1998; Lynch and Walsh, 1998; Churchill and Doerge, 1999; Flint and Mott, 2001; Hackett, 2002; Mauricio, 2001). However, a limited number of related issues will be briefly addressed as necessary.

Although the principles of QTL analysis were first outlined and successfully applied in the early 1920s to map a QTL for seed size in bean tightly linked to a gene controlling seed pigmentation (Sax, 1923), a wide-scale application of QTL analysis was not possible at that time due to the paucity of genetic markers available. The systematic identification and characterization of QTLs was finally made possible more than 50 years later, following the introduction of the first class of molecular markers (restriction fragment length polymorphisms, RFLPs) suitable for an adequately detailed genome-wide survey (Botstein et al., 1980). In maize, the first linkage map based on molecular markers was established by Helentjaris et al. (1986). The time-consuming process of map construction was considerably shortened with the introduction of the PCR-based microsatellite (SSR, simple sequence repeat) markers, particularly suited for mapping purposes due to their high level of polymorphism (Taramino and Tingey, 1996). From the mid-1990s, the addition of AFLPs (amplified fragment length polymorphisms; Vos et al., 1995) has provided an unprecedented level of map saturation (Vuylsteke et al., 1999). Also, sequenced cDNAs (also known as ESTs, expressed sequence tags) became a source of molecular markers and have now been integrated into maize genetic maps (Causse et al., 1996; Davis et al., 1999; Sharopova et al., 2002).

The comparative analysis between QTL data of two or more mapping populations is made possible by directly using the information provided by markers (usually RFLPs and/or SSRs) common to the maps being compared and/or indirectly by referring each mapping population to a reference map. A widely-used reference map for maize is the UMC map (Davis et al., 1999), which contains more than 1700 markers. To facilitate the cross-referring to QTL studies in maize or other cereals, the UMC map has been subdivided into 100 sectors (bins) marked by reliable RFLP markers. The bin framework has been shown to be extremely useful for comparison of QTL positions across experiments (Lin et al., 1995) and it will also be exploited throughout this review for comparing QTLs for MPTs and grain yield across experiments and genetic backgrounds. It is noteworthy that the average genetic length of bins (approx. 17 cM in the map reported by Davis et al., 1998) is roughly similar to the average chromosome interval supporting a QTL peak. Additionally, the UMC map allows us to compare the map position of mutants (Neuffer et al., 1997) with that of QTLs, thus contributing relevant information for the identification of possible candidate genes for a particular trait. Robertson (1985) even postulated that a mutant phenotype at a particular locus may be caused by an allele whose effect is more drastic than that of the QTL alleles at the same locus. In maize, Robertson’s hypothesis has been validated for plant height when a QTL for this trait was found to co-localize with the map position of the mutant dwarf3 (Touzet et al., 1995; Winkler and Helentjaris, 1995), and for plant architecture when a QTL controlling the level of branching was shown to coincide with the mutant tb1 (Doebley et al., 1995).

In principle, once QTLs have been identified, introgression of the favourable alleles and their pyramiding into elite germplasm (e.g. parental lines, populations, etc.) becomes possible through marker-assisted selection (MAS; Ribaut and Hoisington, 1998; Stuber, 1999; Young, 1999). However, only a few successful applications of MAS for the improvement of quantitative traits have been described to date (Hu et al., 1997; Ragot et al., 2000; Ribaut et al., 2000) due mainly to weak associations (in terms of genetic distance) between markers and target QTLs and/or the high costs of MAS (Stuber et al., 1999; Salvi et al., 2001). Certainly, a more rosy picture for MAS emerges considering single-gene traits such as disease resistance (Bus et al., 2000; Witcombe and Hash, 2000).

	QTL ANALYSIS AS A MEANS TO INVESTIGATE ASSOCIATIONS BETWEEN TRAITS

TOP ABSTRACT INTRODUCTION PRINCIPLES OF QTL ANALYSIS QTL ANALYSIS AS A... LITERATURE REVIEW FOR QTLS... ANALYSIS OF THE CO-LOCATION... UNDERSTANDING AND DEALING WITH... ALTERNATIVE APPROACHES TO... FROM QTLS TO GENES FUTURE PERSPECTIVES FOR QTL... CONCLUDING REMARKS LITERATURE CITED

 
A number of approaches can be utilized to analyse the physiological and genetic basis of the associations between traits. Physiological relationships can be established by analysing correlated changes occurring in time or following treatments influencing the target traits (Quarrie and Jones, 1977); these studies can be conducted using a single accession (genotype). The presence of a genetic association between traits can be investigated by testing a number of either unrelated genotypes differing in their mean value for the traits of interest (Tuberosa et al., 1994), or related families derived by divergent selection started from a population segregating for the target trait (Innes et al., 1984; Tuberosa et al., 1986; Landi et al., 2001a, b). Each of these approaches has flaws and is prone to biases, so rarely allows us to ascertain with reasonable precision the extent to which the association is due to pleiotropy and/or linkage. Alternatively, QTL analysis enables us to investigate with greater precision the genetic basis of trait association merely by looking for co-location on the genetic map of the corresponding QTLs. Consequently, QTL studies provide us with useful information to elucidate the causal pathways linking two or more traits (Simko et al., 1997), as is the case of MPTs and yield under drought (Lebreton et al., 1995; Prioul et al., 1997; Sanguineti et al., 1999). Co-location of QTL peaks for two traits can result from a number of alternative scenarios as shown in Fig. 1 (redrawn after Lebreton et al., 1995): (A) two tightly linked genes modulating the expression of separate traits, but not separated by the statistical tests adopted; (B) one gene with a single function which leads to a sequence of causally related events; (C) one gene with an effect on two or more traits independent of each other; or (D) two tightly linked genes with effects on the same two or more traits. Linkage, namely the first scenario, can be distinguished from pleiotropy, the second and third scenarios, whenever an improved mapping resolution (e.g. increasing the number of tested progenies and/or more markers mapped in the region of interest) leads to the identification of recombinant progenies for the two associated traits, i.e. the parental alleles of the linked genes controlling the two traits separate in one or more recombinant progenies. The opposite finding (i.e. no recombinant progeny) cannot prove with certainty that pleiotropy is the cause of the association; however, pleiotropy becomes increasingly plausible when co-segregation of the two traits is maintained when an increasing number of segregating individuals are considered. The final proof for pleiotropy can be obtained through the cloning and manipulation of the gene/s underlying the QTL in question. Further complexity can be added to the models presented in Fig. 1A–C because co-location of QTLs could also be due to the combined effects of linked genes with possible pleiotropic effects as shown in Fig. 1D.

View larger version (8K): [in this window] [in a new window]   Fig. 1. (redrawn after Lebreton et al., 1995) Four models for the possible association between two traits whose expression is influenced by the same chromosome region. A, Linkage. Traits 1 and 2 controlled independently by two distinct QTLs which are closely linked but not separated by the statistical tests adopted. B, Pleiotropy. Two traits causally associated and regulated by a QTL acting directly on one trait only. C, Pleiotropy. Traits 1 and 2 controlled independently by a single gene. D, Linkage and pleiotropy. Traits 1 and 2 controlled independently by two distinct QTLs which also have pleiotropic effects (see text for an example).

 
For an example of pleiotropic effects as depicted in Fig. 1C and pertinent to this article, we will consider leaf ABA concentration and root growth (corresponding to traits 1 and 2, respectively, in Fig. 1). Under drought conditions, the scenario presented in Fig. 1C could be reconciled with either (1) a gene influencing the signalling cascade (e.g. gene encoding a signal receptor) leading from the perception of the drought stress to the activation of the genes independently governing leaf ABA concentration and root growth; or (2) a regulatory gene encoding a protein (e.g. transcription factor) with a DNA-binding domain capable of promoting the expression of the independent genes influencing leaf ABA concentration and root growth. Eventually, the scenario described in Fig. 1B, which implies a causal effect of ABA on root growth, can be validated if a QTL for ABA concentration in root tips is also mapped in the same region. However, it should be noted that, given the complex relationships between ABA concentration and root growth, the opposite explanation (i.e. root growth influencing ABA concentration) is also plausible, particularly at a later stage of development (e.g. near flowering). Therefore, when considering traits such as ABA concentration and root size whose cause–effect relationships may switch according to the growth stage (i.e. from ABA having a greater influence on root size at an early stage, to root size influencing ABA at a later stage; see also Sanguineti et al., 1999), the interpretation of the results becomes more complex.

When considering two or more complex traits for which several QTLs have been mapped, co-location of the QTL peaks can occur by mere chance due to linkage. For example, in maize, where the map has been subdivided into bins of approximately similar genetic length, if a number (N) of QTLs for traits A and B have been mapped to N_A and N_B chromosome bins, respectively, then the percentage of bins expected to harbour, by mere chance, QTLs for both traits should be equal to [(N_A x N_B)/N_T²] x 100, where N_T indicates the total number of chromosome bins covered by the map used to identify the QTLs. The application of this formula assumes: (1) the possibility of correctly assigning the position of the QTL peak to a single chromosome bin, an assumption not always met with QTLs characterized by wide support intervals and maps with low marker density; and (2) a uniform distribution of the QTLs among bins, which is also a rather unlikely assumption in maize as already shown by the work of Khavkin and Coe (1997). As more data on QTL distribution become available for maize, the extent of the bias introduced by the non-uniform distribution of QTLs among chromosome bins could be accounted for in the formula including appropriate coefficients for each bin. On the same line, the formula will underestimate the degree of overlap whenever the QTLs are only 5–10 cM apart but are assigned to adjacent bins.

Another indirect and empirical way of evaluating whether linkage or pleiotropy causes trait association at a number ‘N’ of regions where the QTLs for the traits in question overlap is provided by the analysis of the sign of the additive effects of the QTLs (computed as half of the difference between the average values of the parental QTL alleles) at all ‘N’ regions. Although genetically linked genes may account for the association between two traits at any particular QTL, it is very unlikely that linkage is the cause of the association between the same traits at a number of different QTLs when the sign of the association (positive or negative) between the genetic effects remains the same at all QTLs. In fact, if linkage causes the association, the chances of finding alleles linked in coupling (i.e. ‘plus’ or ‘minus’ alleles at both loci controlling the two traits) equal the chances of finding alleles linked in repulsion (i.e. one ‘plus’ and one ‘minus’ allele at each one of the two loci), unless selection has favoured one vs. the other, an event rather unlikely to occur at a number of independent loci. Conversely, if pleiotropy is the primary cause of the association between two traits, then it is more likely that a similar relationship is found at most, if not all, of the QTLs where the overlap occurs. Therefore, the probability of finding the same linkage phase (coupling or repulsion) by chance alone at a number of ‘N’ QTL regions equals 0·5^N. However, the presence of contrasting associations at regions showing co-location of QTLs does not disprove pleiotropy, since the sign of the association between traits could well vary according to the growth stage and the environmental conditions present when the gene(s) underlying that particular QTL was expressed, as previously indicated for the association between ABA concentration and root size (see also Sanguineti et al., 1999).

The first attempt to utilize QTL data to test for possible causal relationships among MPTs in drought-stressed maize was carried out by Lebreton et al. (1995) who suggested that if trait A has a regulatory role on trait B (e.g. xylem ABA controlling stomatal conductance), the most significant QTLs for trait A should have a measurable effect at the same QTL regions on trait B. Conversely, if trait B (e.g. stomatal conductance) has a more complex genetic basis as compared with trait A (e.g. xylem ABA), then trait B will probably have significant QTLs not coincident with those for trait A.

	LITERATURE REVIEW FOR QTLS FOR ABA CONCENTRATION AND ROOT TRAITS

TOP ABSTRACT INTRODUCTION PRINCIPLES OF QTL ANALYSIS QTL ANALYSIS AS A... LITERATURE REVIEW FOR QTLS... ANALYSIS OF THE CO-LOCATION... UNDERSTANDING AND DEALING WITH... ALTERNATIVE APPROACHES TO... FROM QTLS TO GENES FUTURE PERSPECTIVES FOR QTL... CONCLUDING REMARKS LITERATURE CITED

 
QTLs for ABA concentration
An increase in ABA concentration is a universal and firmly established response of plants subjected to drought and other abiotic stresses (Larqué-Saavedra and Wain, 1976; Davies and Zhang, 1991; Quarrie, 1991; Ribaut and Pilet, 1991). Extensive evidence indicates the pivotal role of ABA in regulating several processes at the molecular, cellular, organ and whole plant levels under conditions of water deficit (Zeevaart and Creelman, 1988; Saab et al., 1995; Sharp, 1996; Bray, 1997; Netting, 2000). ABA modulates the expression of a large number of genes whose products may protect the cell from the harmful effects of an excessive water loss (Close, 1996, 1997; Ingram and Bartels, 1996; Bray, 1997). In maize seedlings subjected to artificially induced conditions of water deficit (Sharp, 1996), an increased ABA concentration increased the root to shoot ratio, an adaptive change which could be important for avoiding dehydration under conditions of low water availability in the upper layer of the soil profile. It has been suggested that the role of ABA in maintaining root cell elongation at low water potential may involve enhanced expression or activity of cell wall-yielding factors through an interaction with ethylene production (Wu et al., 1996; Spollen et al., 2000). It has also been shown that ABA affects proline accumulation throughout maize primary roots (Ober and Sharp, 1994); this suggests that ABA may play a regulatory role in maintaining the osmotic status of the roots at low water potential (McDonald and Davies, 1996). The most widely recognized adaptive role of an increased ABA concentration under water-limited conditions is the reduction of stomatal conductance and water lost by transpiration (Tardieu et al., 1992, 1993; Tuberosa et al., 1994; Trejo et al., 1995; Li et al., 2000). It has also been shown that ABA facilitates water uptake into maize roots as soil starts drying, particularly under non-transpiring conditions, when the apoplastic path of water transport is largely excluded (Hose et al., 2000). More recent work carried out in arabidopsis has shown that ABA also plays an important role in mediating the stimulation of lateral root elongation by local NO₃^– applications (Signora et al., 2001).

A literature search of the bibliographic databases indicates that QTLs for leaf ABA (L-ABA) concentration in maize have been investigated in three different populations (Lebreton et al., 1995; Tuberosa et al., 1998a, b). One of these studies has also reported QTLs for the concentration of ABA in the xylem sap (X-ABA; Lebreton et al., 1995). Figure 2 reports a tentative allocation of the QTLs for L-ABA and X-ABA of the three populations to the bins of the UMC reference map. The large number of QTLs governing variation in ABA concentration in these populations should be related to their different genetic backgrounds as well as to differences in the growing conditions (e.g. glasshouse or field), dynamics (e.g. duration, timing and intensity) of the water-stress episodes and in the growth stage at which plants were subjected to drought. Altogether, these results confirm and expand the complexity of the genetic basis of ABA concentration in maize which had already been postulated in earlier studies based on more conventional genetic approaches (Ivanovic et al., 1992; Sanguineti et al., 1996).

View larger version (32K): [in this window] [in a new window]   Fig. 2. Bin allocation on the maize map of the QTLs for root traits in hydroponics and in the field, ABA concentration in the leaf and in the xylem sap, anthesis–silking interval (ASI) and grain yield (GY) in 11 maize populations (a–k). Coloured bars indicate QTLs assigned to a single bin; within each bin, bar position does not reflect the most likely position of the QTL peak. Vertical parentheses spanning two bins indicate QTLs that could not be assigned to a single bin. According to the population considered, numbers in parentheses indicate the following: number of root characteristics for which a QTL was detected in hydroponics (populations a and b) or in the field (populations a, c and d); number of samplings and/or environments in which a QTL was detected for leaf ABA concentration (populations c, e and f); ASI populations a, b, e, g and h); and grain yield (GY; populations a, b, c, e, g, h, i, j and k). Asterisks indicate QTLs for the concentration of ABA in the xylem sap. QTLs for root traits and ABA concentration are reported to the left of each chromosome, while QTLs for ASI and GY are reported to the right of each chromosome. For the sake of simplicity, the QTLs for GY of the B73 x H99 population tested under low- and high-nitrogen conditions have been indicated as obtained under water-stressed and well-watered conditions, respectively.

 
A more detailed analysis of the results of the above-mentioned experiments indicates that the highest number (16) of QTLs for L-ABA was reported in the Os420 x IABO78 background (Tuberosa et al., 1998c). The high number of QTLs identified in this 2-year study investigating ABA at two growth stages (at stem elongation and tasseling) is most likely to be the result of the increased chances of detecting QTLs in at least one of the four samplings analysed, the large variation in L-ABA among the 80 F₄ families (from 264 to 680 ng ABA g^–1 d. wt) and the high heritability of L-ABA (from 0·68 to 0·88). Of the 16 QTLs identified, only four significantly influenced mean L-ABA values across samplings. At all these four primary QTLs, the effect of the parent alleles was consistent when analysed in each individual sampling; the alleles which increased L-ABA were contributed by Os420, the high-ABA parent line. The most important and consistent QTL mapped on bin 2·04 near csu133. The effects associated with the QTL near csu133 were more pronounced near flowering. In the same region, a QTL for L-ABA has also been described in Polj17 x F-2 at two growth stages (Lebreton et al., 1995); also in this case, the QTL showed a stronger effect near anthesis. Additionally, preliminary results have indicated that in the population described in Ribaut et al. (1996, 1997c) the QTL likelihood profile for ABA concentration in the ear peaks near csu133 (M. Ribaut and T. Setter, pers. comm.).

The presence of a QTL for L-ABA near csu133 has been validated through a divergent selection for L-ABA started from 480 (Os420 x IABO78) F₂ plants (Sanguineti et al., 1996; Landi et al., 2001a). Following the completion of two cycles of selection (from F₂ to F₄) for high or low L-ABA under conditions of moderate drought stress in the field, the csu133 profiles of the eight F₄ families with the highest ABA values and the eight F₄ families with the lowest ABA values were investigated. The csu133 allele associated with the low L-ABA parental allele was fixed in all eight low L-ABA families, while the csu133 allele associated with the high L-ABA parental allele was fixed in seven high L-ABA families, with only one F₄ family being heterozygous (Salvi et al., 1997). These results provided convincing evidence that the chromosome region near csu133 harbours one or more genes with a strong effect on L-ABA. The consistency of the LOD values (up to 7·1) and the size of the additive effects (up to 86 ng ABA g^–1 d. wt) shown by this QTL on L-ABA coupled with its narrow support interval (approx. 5 cM) in Os420 x IABO78 (Tuberosa et al., 1998c) prompted the derivation of backcross-derived lines (BDLs) in the Os420 x IABO78 genetic background (Landi et al., 2002). Six parallel cycles of backcrossing allowed us to obtain BDLs homozygous for the high-ABA allele or for the low-ABA allele of both parents (Os420 and IABO78). The backcross procedure was aided by using the two closely linked RFLP loci flanking (approx. 9 cM apart) the target QTL. Preliminary results obtained under conditions of moderate drought in the field have shown a significant difference between the mean value of BDLs homozygous for the allele increasing ABA (provided by Os420) and BDLs homozygous for the allele decreasing ABA (provided by IABO78). In particular, the additive effect of the QTL averaged across BDLs was equal to 31 ng ABA g^–1 d. wt, corresponding to 12·4 % of the overall mean (Landi et al., 2002). In our previous investigation conducted on F₄ families derived from the same cross (Tuberosa et al., 1998c), the additive effect at this QTL was estimated to be equal to 49 ng ABA g^–1 d. wt, corresponding to 12·3 % of the overall mean. These results thus indicate that the target QTL was successfully transferred by the marker-assisted backcross, and further confirm the stability and the relative importance of its additive effect.

As compared with the previous study, a smaller number (seven; see Fig. 2) of QTLs was found to influence L-ABA at two growth stages (early- and mid-phases of stem elongation) in the 151 F₃ families derived from the cross A662 x B73 which were tested under rainfed conditions in two locations (Tuberosa et al., 1998a). The limited number of QTLs for L-ABA evidenced in this study was probably a consequence of the low level of water stress experienced by the plants at the time of sampling, as indicated by the low average value of L-ABA in all four samplings (from 192 to 241 ng ABA g^–1 d. wt), and/or the small difference in L-ABA value of the parental lines (235 and 266 ng ABA g^–1 d. wt in A662 and B73, respectively, across samplings; unpubl. res.). Two QTLs (on bins 5·06–5·07 and 8·07) influenced L-ABA in both locations, while no overlap was evidenced between growth stages within each location.

A high number of QTLs influenced ABA concentration in leaf and xylem samples collected in 81 F₂ plants derived from the cross Polj17 x F-2 (Fig. 2; Lebreton et al., 1995). Samples were collected 3 weeks before flowering under well-watered conditions and at flowering under conditions of water deficit. With the exception of chromosome 8, which was poorly represented (only two markers), all other chromosomes were found to harbour QTLs influencing ABA concentration. Of these regions, one on bin 1·06 and one on bin 2·04 near csu133 significantly influenced L-ABA at both water regimes. The QTL with the strongest effect (LOD = 8·0) under drought conditions was located on bin 3·06 near umc39b. The QTLs for X-ABA showed a poor overlap with those for L-ABA, a result in keeping with the low correlation found between these two traits in maize (Zhang and Davies, 1990; Tardieu et al., 1991; Tuberosa et al., 1994). Only two of the four QTLs which influenced leaf water potential (LWP) were located in regions near QTLs for X-ABA or L-ABA, a result which led Lebreton et al. (1995) to suggest that it was unlikely that variation in L-ABA was consequent to variation in the degree of drought stress. In this case, no data were collected on leaf relative water content (LRWC), another indicator of the water status of the plant.

A fairly extensive overlap among QTLs for L-ABA and QTLs for LRWC was found in Os420 x IABO78: of the 16 QTLs that significantly affected L-ABA, seven concomitantly influenced LRWC in at least one of the two growth stages considered (Sanguineti et al., 1999). At all QTLs but one (mapped on bin 10·04), the corresponding additive effects for LRWC and L-ABA were negatively associated, a finding that suggests that in this case L-ABA mainly represented an indicator of the level of drought stress experienced by the plant at sampling, contrary to the results reported by Lebreton et al. (1995). It is most likely that this apparent discrepancy is due to the different traits considered to survey the water status of the plant and/or to the different genetic backgrounds of the material evaluated in the two studies. Additionally, the differences in the expected inbreeding levels of the two populations (0·875 in the F₄ families of Os420 x IABO78 vs. 0·500 in the F₂ plants in Polj17 x F-2) may have influenced their vigour and thus may have magnified the effects on L-ABA of differences in the water status of the plants.

Tuberosa et al. (1998c) investigated whether known mutants affected in ABA biosynthesis might be possible candidates for the QTLs controlling L-ABA. Based on information provided by RFLP markers common to the UMC map and the Os420 x IABO78 map, it was shown that the map positions of mutants impaired in ABA biosynthesis (e.g. vp5, vp14, etc.) were outside the support intervals of the QTLs influencing L-ABA. The rate-determining step for ABA biosynthesis is controlled by vp14 (Schwartz et al., 1997; Milborrow, 2001), which has been mapped to bin 1·08 (Tan et al., 1997). Also, it should be noted that in both A662 x B73 and Polj17 x F-2, no QTL was found for ABA concentration in bin 1·08. These results, while providing no evidence that the major gene involved in the biosynthesis of ABA might be responsible for the QTLs for L-ABA, leave the question open as to what sort of genes may underlie these QTLs. Among a number of possibilities, feasible candidates could be the genes influencing the intensity of the transduction signal associated with turgor loss, a major determinant in the regulation of ABA concentration (Jensen et al., 1996), and/or genes controlling MPTs (e.g. root size and architecture, leaf area, leaf angle, osmotic adjustment, etc.) affecting the water balance of the plant, hence its turgor. Interestingly, the results of Lebreton et al. (1995) showed that the QTL for L-ABA near csu133 (bin 2·04) clearly overlapped with a QTL for root pulling force. Additionally, Quarrie et al. (1999) reported that recurrent selection for grain yield under drought conditions significantly changed allele frequencies at csu133 in two populations developed at the International Maize and Wheat Improvement Center (CIMMYT), namely Tuxpeño Sequia (Bolaños and Edmeades, 1993) and Drought Tolerant Population (Bolaños et al., 1993). Collectively, these results support the importance of this region in controlling drought-related traits and yield in maize.

QTLs for root traits
Although root characteristics have been shown to be important factors influencing drought avoidance (Sullivan, 1983; O’Toole and Bland, 1987), little is known about their genetic control and their contribution to yield under drought conditions. This is largely due to the difficulty in properly investigating roots in a large number of plants, particularly in field experiments. In field-grown maize, root pulling force (RPF) is one of the traits which allows for large-scale investigation of roots below the soil surface (Kevern and Hallauer, 1983; Fincher et al., 1985). It is important to determine the extent to which RPF reflects root characteristics investigated with more precise but much more laborious approaches like the analysis of root density in soil cores. Sanguineti et al. (1998) have shown that maize root density in both the 30–70 cm and in the 70–110 cm layers was positively associated with RPF (r = 0·67 and 0·71, respectively) in a set of inbred lines differing in root size and architecture; in contrast, no significant association with RPF was evident in the 0–30 cm layer. It should also be mentioned that RPF was one of the MPTs significantly affected by eight cycles of recurrent selection for grain yield under drought conditions in tropical maize (Bolaños et al., 1993). In this case, RPF was negatively associated with grain yield, which led the authors to suggest that improved drought tolerance was due to increased partitioning of biomass towards the developing ear during a severe drought stress coinciding with flowering, rather than a change in plant water status.

Lebreton et al. (1995) identified QTLs for root traits in the Polj17 x F-2 population also investigated for L-ABA and X-ABA (see previous section). The phenotypic evaluation focused on seminal root number (SRN), nodal root number at the base of the stem (NRN) and on RPF measured at the end of the season. There were seven QTLs with a LOD value higher than 2·0 for RPF and four for both SRN and NRN. Because QTL data were also available for ABA concentration, the causal relationships between root traits and ABA concentration were analysed by adopting the procedures summarized earlier (see ‘QTL analysis as a means to investigate associations between traits’). The findings supported the hypothesis that ABA concentration was more likely to regulate RPF than vice versa, an interpretation consistent with the positive relationship between the endogenous ABA concentration and primary root growth in maize seedlings grown under artificial conditions of drought stress (Sharp et al., 1994; McDonald and Davies, 1996). At all QTLs but one, the sign of the additive effects on ABA concentration and RPF was similar. This result could be due to one or more genes in this particular QTL region regulating root growth independently from ABA but capable of influencing its concentration via the water status of the plant: in this case, the QTL effects on root growth and ABA concentration are more likely to be negatively correlated. As to NRN, the comparative analysis of the effects at the most important QTLs revealed a striking correlation between nodal root number and X-ABA (r = 0·84, P < 0·001), which led the authors to suggest that ABA content in the xylem collected from the leaves is largely determined by the nodal roots.

Under field conditions, Guingo et al. (1998) described maize QTLs for root traits in a 2-year study carried out with 100 test-crosses obtained from crossing an early dent line (F252) with 100 recombinant inbred lines (RILs) derived from the cross F-2 x Io (Causse et al., 1996). Among other traits, the number of nodal roots (below soil surface) on internodes 6, 7 and 8 (RI6, RI7 and RI8, respectively) and the mean diameter of roots on internode 7 (Droot7) were considered. Although the heritability of these traits was fairly high (from 0·56 to 0·62), only one QTL was found to significantly influence the variation measured for RI6, RI7 and RI8, while three QTLs were found for Droot7. The small number of QTLs detected for these traits is probably related to the limited number of test-cross families considered and/or, at least for RI6, RI7 and Droot7, to the rather limited variation reported in the mean values of the test-crosses. Accordingly, the coefficients of total genetic determination (R²) were low (from 21 to 44 %), a finding which suggests that the majority of QTLs modulating the investigated traits went undetected. Epistasis was another possible reason invoked by Guingo et al. (1998) to account for the small number of QTLs detected in their study. The only QTL that concomitantly influenced two root traits (RI7 and RI8) was on bin 5·05 between SC343B and SC403; from a practical standpoint, the co-location of QTLs for different root traits indicated that MAS for this QTL region on chromosome 5 could have beneficial effects on root lodging and yield.

The main limitations to field studies of roots in the soil are the large amount of work required and the usually destructive nature of the measurements (Beck et al., 1987). As an alternative to field studies, hydroponics offers a number of noticeable advantages for investigating roots. These include easy access to roots, non-destructive and subsequent observations on the same plants, coupled with the possibility of measuring a large number of plants in a small space; furthermore, the addition of polyethylene glycol (Nagy et al., 1995) allows us to test plants under predetermined and uniform conditions of water stress, a condition very difficult to achieve otherwise. The most distinct disadvantage of hydroponics is the very unnatural environment in which roots grow. It is important to appreciate that in terms of QTL identification of root traits and practical application of this information (e.g. MAS), what matters is not the absolute values of root traits measured in hydroponics and in the soil, but rather the magnitude and type (‘cross-over’ or not) of ‘genotype x environment’ interaction for the root traits analysed in the progenies of the mapping populations. Therefore, if QTLs influencing genetic variation of root traits in hydroponics also regulate root growth in the field, it may be possible to identify among such QTLs those with an associated effect on yield, provided, of course, that genetic variability in root traits affects yield. This aspect is particularly relevant in maize in which the importance of the seminal (embryogenic) roots declines as a result of the prevailing role in the adult plant of shoot-born roots, commonly named ‘adventitious’ nodal roots (Kiesselbach, 1949). Nevertheless, a positive correlation between root traits of maize seedlings and those of mature plants was reported by Nass and Zuber (1971). Furthermore, a relationship was found between seminal root traits of maize seedlings in hydroponics and root lodging in the field, an important trait influencing grain yield (Landi et al., 1998; Sanguineti et al., 1998). Significant, albeit weak, associations have also been reported between seminal root traits in hydroponics and RPF in the field (Landi et al., 2001b).

QTLs for root traits in hydroponics were investigated in 171 F₃ families derived from the cross between Lo964 and Lo1016, two lines which were previously shown to differ greatly for root characteristics (Sanguineti et al., 1998). Tuberosa et al. (2002) identified 11, seven, nine and ten QTLs (LOD >2·5) regulating primary root length (R1L), primary root diameter (R1D), primary root weight (R1W) and the weight of the adventitious seminal roots (R2W), respectively. The high LOD value (>5·0) of ten QTLs and their sizeable R² values (from 14·7 to 32·6 %) suggested the presence of QTLs with major effects. In total, 37 QTLs were grouped and assigned to 24 bins; ten bins concomitantly influenced at least two root traits (Fig. 2). Four of these regions were on chromosome 1 (bins 1·02, 1·06, 1·07–1·08 and 1·11). The QTL with the most sizeable effects (LOD values of 14·7, 6·4 and 8·3 for R1D, R1L and R2W, respectively) was found on bin 1·06 between PGAMCTA205 and php20644. To verify whether some of the QTL regions influencing root traits in hydroponics also modulate root growth in the field, 118 F₃ families of the same mapping population were tested for RPF in three replicated field experiments (Giuliani et al., 2000 and unpubl. res.). QTLs were assigned to 19 bins, 11 of which (representing 13·7 % of the 80 bins explored by the Lo964 x Lo1016 map) also harboured a QTL for one or more root traits in hydroponics. In this case, applying the formula described in the section on QTL analysis and considering the 80 bins explored by the map, the percentage of bins expected by chance to harbour QTLs for root traits in hydroponics and in the field equals 7·1 {computed as [(24 x 19)/80²] x 100}.

Among the QTLs identified in hydroponics in Lo964 x Lo1016, only one on bin 2·03 overlapped with one of the six root QTLs described in the field study of Guingo et al. (1998). In the Polj17 x F-2 population, a total of 15 QTLs were detected for RPF, NRN and/or seedling root number; these QTLs were located on 14 different bins, six of which also harboured QTLs for root traits identified in hydroponics and/or in the field with the Lo964 x Lo1016 population.

The same root traits investigated in hydroponics in Lo964 x Lo1016 were also measured by Tuberosa et al. (2000 and unpubl. res.) in 120 RILs of the mapping population developed at CIMMYT from the cross Ac7729 x Ac7643/TZSRW and previously tested as F₃ families under drought conditions for yield and other agronomic traits (Ribaut et al., 1996, 1997c). Among the 16 bins which carried a QTL for root traits (R. Tuberosa et al., unpubl. res.), eight were common to both populations (Fig. 2).

Collectively, these results indicate the feasibility of using hydroponics to identify QTLs for root traits, a number of which might also influence variation in root traits under field conditions. However, it is impossible to ascertain at this stage the extent to which these results might be due to random coincidence of a number of closely linked QTLs independently affecting root traits in hydroponics and in the field rather than to the effects of the same set of genes modulating root growth in hydroponics and also in the field. The most noticeable overlap for QTLs influencing root traits in hydroponics and in the field occurred on bin 1·06 which represents the most promising candidate region for a validation study through MAS. In fact, this bin harbours QTLs for root traits in hydroponics in Lo964 x Lo1016 (Tuberosa et al., 2002) and Ac7729 x Ac7643/TZSRW (Tuberosa et al., 2000), and QTLs for root pulling force in both Lo964 x Lo1016 (Giuliani et al., 2000) and Polj17 x F-2 (Lebreton et al., 1995). Furthermore, this bin also revealed QTLs for L-ABA in Os420 x IABO78 (Tuberosa et al., 1998c) and in Polj17 x F-2 (Lebreton et al., 1995), for the ASI in Lo964 x Lo1016 (R. Tuberosa et al., unpubl. res.) and QTLs for grain yield (see next section). Altogether, the sizeable effects of this region on root traits and grain yield warrant the development of near isogenic lines (NILs) differing for the parental segment at this QTL. The availability of NILs for this QTL region would also open the way for undertaking positional cloning of the corresponding gene(s), in which case hydroponics would allow for a quick root phenotyping at an early growth stage.

Another interesting region is located on bin 1·03 near umc11 where a QTL for root traits was found in two of the four populations herein considered. Bin 1·03 also harboured the major QTL for root biomass and leaf growth rate in a drain-pipe experiment carried out in DTP79 x B73 (S. A. Quarrie, pers. comm.). Furthermore, bin 1·03 also harbours QTLs for ABA concentration in the leaf (in Os420 x IABO78 and A662 x B73) and in the xylem (in Polj17 x F-2). The root mutant rtcs (rootless for crown and lateral seminal root) has been mapped approx. 15–20 cM away from umc11 (Hochholdinger et al., 1998). Other maize mutants have been described (Doyle, 1978; Wen and Schnable, 1994; Neuffer, 1997; Hochholdinger and Feix, 1998; Hochholdinger et al., 1998; Krebs et al., 1999), but have not been mapped with sufficient precision to allow for a meaningful comparison with the QTL data herein presented. Finally, it is worth mentioning that a comparative analysis based on sinteny relationships between maize and rice presented by Quarrie (1996) indicated that at least five QTL regions for root traits in Polj17 x F-2 correspond to regions in rice regulating root characteristics (Champoux et al., 1995). The most notable coincidence was again between the region near umc11 on chromosome 1 in maize and the region between RG104A and RG227 on chromosome 3 in rice. This chromosome region of rice also influenced root penetration ability (Price et al., 2000) and RPF (Ali et al., 2000).

	ANALYSIS OF THE CO-LOCATION OF QTLS FOR ABA CONCENTRATION AND ROOT TRAITS WITH QTLS FOR ASI AND GRAIN YIELD UNDER DROUGHT CONDITIONS

TOP ABSTRACT INTRODUCTION PRINCIPLES OF QTL ANALYSIS QTL ANALYSIS AS A... LITERATURE REVIEW FOR QTLS... ANALYSIS OF THE CO-LOCATION... UNDERSTANDING AND DEALING WITH... ALTERNATIVE APPROACHES TO... FROM QTLS TO GENES FUTURE PERSPECTIVES FOR QTL... CONCLUDING REMARKS LITERATURE CITED

 
The majority of QTL studies aimed at evaluating drought tolerance in crops have been carried out at only one water regime, thus precluding the distinction between the constitutive (per se) and adaptive nature of QTL effects. This type of information would be of great value for applying MAS more effectively to each targeted environment. Frequently, the effects of specific QTL alleles on yield show substantial variation according to the type of environment. Sorting out constitutive from adaptive QTL effects is made possible by the evaluation of the same mapping population at different water regimes (Ribaut et al., 1996b, 1997c; Frova et al., 1999; Pelleschi et al., 1999; Sari-Gorla et al., 1999; Tuberosa et al., 2002).

In maize, Ribaut et al. (1996, 1997c) reported QTLs for grain yield (GY) and ASI at three water regimes evaluating 240 F₃ families derived from the cross Ac7729 x Ac7643/TZSRW (Fig. 2). The main aim of these authors was to evaluate the effects on GY of the degree of synchronization of pollen shed and silk extrusion, also known as ASI. In maize, it is well known that the most critical stage in terms of yield losses due to drought is just before and during flowering (Westgate and Boyer, 1985; Artlip et al., 1995; Jones and Setter, 2000; Saini and Westgate, 2000) and that ASI and GY are negatively associated under drought (Bolaños and Edmeades, 1993, 1997; Agrama and Moussa, 1996; Chapman and Edmeades, 1999). ASI can thus be used as a reliable and an easily scorable indicator of the level of water stress experienced by the maize plant. Although ASI can be selected effectively based on visual observations, it is desirable to identify molecular markers linked to the QTLs for ASI in order to select for this trait more effectively under drought and to continue selecting in the absence of drought at flowering (Ribaut et al., 1997b). Additionally, MAS allows for the early selection of plants carrying the most favourable allelic combination at the QTLs influencing ASI. The results of Ribaut and coworkers highlighted the presence of QTLs with fairly stable effects on ASI across the two drought-stress treatments: of the seven QTLs evidenced altogether, five were common to both water regimes. Furthermore, three of these QTLs (on bins 1·08, 2·07–2·08 and 6·05) were also evidenced for ASI in well-watered conditions. A QTL for ASI on bin 1·08 was also found in B73 x H99 (Sari-Gorla et al., 1999).

The co-location between QTLs for GY and those for L-ABA at two growth stages (stem elongation and tassel appearance) and ASI was reported in the 2-year study carried out with the mapping population derived from Os420 x IABO78 (Sanguineti et al., 1999). The overlap between QTLs affecting both L-ABA and ASI was more extensive in 1994 (four of the eight QTLs for ASI) compared with 1995 (one of the five QTLs for ASI). With the exception of a QTL on chromosome 2 near csu133 (bin 2·04), at all the other QTLs a high L-ABA was associated with a longer ASI, a finding that suggests the likely presence of pleiotropic effects. The four and six QTLs identified for GY in 1994 and 1995 accounted for 49·1 and 66·2 % of the genetic variation among F₄ families, respectively. Overlap of QTLs for L-ABA and GY occurred at two of the four QTLs for GY in 1994 and four of the six QTLs for GY in 1995. Two QTLs (on chromosome 1 near umc128, bins 1·07–1·08, and on chromosome 7 near asg8, bin 7·00) significantly influenced GY in both years; the values of the additive effects of these QTLs were the highest and showed opposite directions relative to an increase in L-ABA. To interpret these contrasting results in terms of pleiotropic effects, the authors suggested a tentative model based on reciprocal cause–effect relationships between ABA and root size according to the growth stage. Although models like this one are highly speculative, they show how QTL information can be utilized to better understand the effects on GY due to genetic variation in MPTs. It should be noted that although root characteristics were not measured in the mapping population derived from Os420 x IABO78, a field experiment indicated that IABO78 (the low-ABA parental line), as compared with Os420 (the high-ABA parental line), was characterized by a significantly higher RPF coupled with a higher root density in deeper soil layers (Sanguineti et al., 1998). In general, the QTL results reported in Sanguineti et al. (1999) indicate that L-ABA mainly represented an indicator of the level of drought stress experienced by plants at sampling. This was, in turn, related to the fact that plants grown under droughted field conditions and differing in MPTs influencing their water status will also differ in L-ABA, in part independently from their capacity to accumulate ABA at a similar level of drought stress. Based on these considerations, future work considering ABA concentration as a selection criterion should preferably be carried out under conditions which allow for testing segregating progenies under a uniform level of drought stress.

QTLs for GY under well-watered (WW) and water-stressed (WS) conditions, together with QTLs for root traits, were reported in Lo964 x Lo1016 (Tuberosa et al., 2002). In the field, seven and eight QTLs were identified for GY-WW and GY-WS, respectively, which represented a total of 12 bins. Several overlaps occurred between the QTLs for root traits and QTLs affecting GY. Based on the number of bins harbouring QTLs for root traits in hydroponics (24 bins) and QTLs for GY (12 bins), the percentage of bins that influenced both categories of traits (7·5 %) was higher than that expected by chance (4·5 %). Among the root traits investigated (see previous section), R2W most frequently and consistently overlapped with QTLs for GY-WW and GY-WS. At four QTL regions (bins 1·06, 1·08, 10·04 and 10·07), an increase in R2W was positively associated with GY. The consistency of the sign of the additive effects for R2W with those for GY-WW and GY-WS at these four QTLs makes it more likely that pleiotropy caused this association in all cases, in accordance with the earlier section on ‘QTL analysis’. A 10 cM interval on bin 1·06 between PGAMCTA205 and php20644 showed the strongest effects on R1L, R1D, R2W, GY-WW and GY-WS. At least nine bins in Lo964 x Lo1016 (Tuberosa et al., 2002) which harboured QTLs for GY and for root traits in hydroponics also overlapped with QTLs for RPF and/or brace roots surveyed in three field experiments in which the destructive nature of RPF precluded the collection of data for GY (Giuliani et al., 2000, unpubl. res.).

QTLs for ASI and GY identified by Agrama and Moussa (1996) under conditions of limited water availability in SD34 x SD35 have also been reported in Fig. 2. Three of the five QTLs (LOD >3·0) that significantly affected GY in SD34 x SD35 mapped in bins (1·03, 3·09 and 8·03) also harboured QTLs for root traits in hydroponics of other mapping populations.

An important consideration in drought-stress experiments is that as a soil dries, both water and nitrogen availability may become limiting (McDonald and Davies, 1996). A perturbation in nitrogen supply can alter the hormonal balance (ABA and cytokinins; Clarkson and Touraine, 1994). A decreased availability of nitrogen or other nutrients has been associated with an increased ABA concentration (McDonald and Davies, 1996). Agrama et al. (1999) tested a mapping population derived from B73 x G79 at two levels of nitrogen availability; this led to the identification of six and five QTLs (LOD >2·5) for GY at low and high nitrogen availability, respectively. Only two regions (bins 9·06–9·07 and 10·04–10·05) harboured QTLs affecting GY at both nutrient levels. In both cases, these regions also affected root traits of other populations tested in hydroponics and in the field (Fig. 2).

More recent work (Hirel et al., 2001) with test-crosses of RILs derived from F-2 x Io grown at two nitrogen levels (high and low) identified several QTLs for nitrogen use efficiency. Coincidence of QTLs for nitrogen use efficiency and GY with genes encoding enzymes involved in nitrogen metabolism (e.g. cytosolic glutamine synthetase) was detected on several bins. The most striking coincidence was for a gene (gln4) encoding glutamine synthetase which maps in bin 5·07 (Hirel et al., 2001). It is also worth mentioning that one of the QTLs evidenced at both nitrogen levels can be assigned to bin 1·06, thus confirming the importance of this region for determining GY under conditions of limited water and nutrient supply.

QTLs for invertase activity have been mapped in F-2 x Io subjected to drought stress (Pelleschi et al., 1999). In this case, water shortage produced an early and strong stimulation of acid-soluble invertase activity in adult leaves, whereas cell wall invertase activity remained constant. This response was closely related to the mRNA level for only one (Ivr2) of the invertase genes. In total, four QTLs were detected for invertase activity under well-watered conditions and nine under drought conditions. One QTL common to both treatments was located near Ivr2, which can be assigned to bin 5·03. Other QTLs for invertase activity were found close to carbohydrate QTLs and some of them formed what the authors referred to as ‘stress clusters’. The two main clusters mapped on bins 1·03 and 5·03.

The results herein summarized indicate that a number of chromosome regions have concomitant effects on ABA concentration, root traits, other MPTs and GY in drought-stressed maize. Among others, the regions corresponding to bins 1·03 and 1·06 warrant further attention to elucidate the genetic basis of such effects and to evaluate the response to MAS for the QTL alleles with a beneficial influence on grain yield. An important trait for which no QTL information is presently available and which could help in interpreting the effects of ABA on other MPTs is sensitivity to ABA. Significant variability among maize lines has been shown for stomatal sensitivity to ABA concentration (Conti et al., 1994) and pollen tube growth at different ABA levels (Frascaroli and Tuberosa, 1993). These findings suggest the possibility of identifying suitable lines for a QTL study targeting sensitivity to ABA. Little information is presently available on the mechanistic basis of variation in sensitivity to ABA (McDonald and Davies, 1996).

	UNDERSTANDING AND DEALING WITH THE SHORTCOMINGS OF QTL ANALYSIS

TOP ABSTRACT INTRODUCTION PRINCIPLES OF QTL ANALYSIS QTL ANALYSIS AS A... LITERATURE REVIEW FOR QTLS... ANALYSIS OF THE CO-LOCATION... UNDERSTANDING AND DEALING WITH... ALTERNATIVE APPROACHES TO... FROM QTLS TO GENES FUTURE PERSPECTIVES FOR QTL... CONCLUDING REMARKS LITERATURE CITED

 
One of the major shortcomings of QTL experiments is the low resolution power in detecting the real number of QTLs regulating the expression of the investigated traits (Charcosset and Gallais, 1996). Sampling variation further reduces the capacity to detect QTLs, particularly with populations of small size (<200 progenies). In a landmark paper, Beavis (1994) applied a Monte Carlo simulation to experimental data and showed that with populations of approx. 100–200 progenies (i.e. the size of a typical QTL experiment), only a modest fraction of QTLs are discovered; additionally, the effects of each single QTL were generally overestimated. A later article showed that with fewer than 500 progenies and independently from marker density, it is very unlikely that QTLs of small effects are uncovered (Beavis, 1998). These predictions were validated in experiments carried out with maize mapping populations sufficiently large (>400 progenies) to allow for meaningful subsamplings (Openshaw and Frascaroli, 1997; Melchinger et al., 1998). The effectiveness of detecting QTLs using the values of single environments and their mean has been evaluated in a number of studies. Jansen et al. (1995) concluded that the chances of detecting a QTL in several environments is small even if no ‘QTL x environment’ interaction is present. Other authors have reported the inconsistency of QTL detection across environments (Paterson et al., 1991; Mather et al., 1997; Wang et al., 1999). Recently, using a simulation approach, Otto and Jones (2000) showed that the number of loci detected in a QTL study is not linearly related with the actual number of underlying QTLs. They also proposed an estimator of the total number of QTLs segregating in experimental populations.

Because of its low resolution power, QTL analysis cannot provide us with a complete molecular dissection of the genetic basis