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  • As has been pointed out in previous

  • modules, most traits of interest in forest trees are quantitatively

  • inherited. That is, they are controlled by many genes,

  • each of which controls a modest amount of the variance

  • in that trait. A gene that controls some portion of the genetic

  • variance of a phenotypic trait is called a quantitative trait locus,

  • or QTL. It is possible to

  • identify QTL and their relative location in the genome by

  • placing them on genetic maps. This is done by demonstrating

  • a statistically significant association between the

  • quantitative trait phenotype and one or more genetic

  • markers already located on a map. QTL mapping

  • is a powerful tool for elucidating the genetic architecture of

  • complex traits and provides a clearly defined approach for marker-assisted

  • selection in applied breeding or natural environment settings.

  • We will identify the key elements of

  • QTL mapping and give some examples of how it has been done

  • in forest trees. Additionally, we will reflect on

  • some of the limitations of the QTL approach using pedigree crosses.

  • Most of the elements required

  • to identify and map QTL are those previously noted for

  • construction of genetic maps themselves. The factors that distinguish

  • QTL mapping from genetic mapping are 1)

  • the need for high quality phenotypes for all the progeny being genotyped

  • and 2) a different set of analytical tools.

  • Let’s quickly review the points noted here.

  • Experimental Populations: For the most part,

  • pedigreed crosses such as those needed for genetic mapping are needed.

  • For outcrossing trees, ideally, this

  • means a three generation intercross, though virtually any

  • cross can be used, including open-pollinated crosses and

  • two-generation pseudo-testcrosses.

  • You may improve your chances of detecting QTL by making the crosses

  • to ensure segregation of the traits of interest in the F2 progeny.

  • The size of the full sib family used is

  • important. Studies have shown that 500 or more progeny

  • are required to avoid bias in the number of QTL identified

  • and the proportion of variation those QTL explain.

  • Informative markers: The best

  • markers are multi-allelic, co-dominant markers that

  • could potentially tag as many as four alleles

  • in the QTL. Generally, these will be

  • the same set of markers used in making your genetic map.

  • The Map: A good framework map

  • with enough markers (say, 75-100)

  • to completely cover the genome is desirable.

  • Phenotypes: High quality measurement of the

  • traits of interest are essential. One way to dramatically

  • improve phenotypic trait estimates is to clonally replicate the progeny

  • in the study trials. In effect, this results

  • in an increase in trait heritability. We will leave

  • comments on the last two points, analytical tools and verification,

  • for later. Suffice it to say that what we seek are

  • associations between differences in phenotypic means

  • of genotypic classes, evaluated one locus at a time.

  • The subsequent effort to accurately locate significant

  • markers is the focus of most of the more

  • sophisticated software.

  • The figure at right illustrates

  • the concept of what constitutes a QTL, as might be

  • found in a three-generation intercross. Note

  • that thedeck is stacked”, so to speak, in the grandparent

  • generation. That is, crosses are made between parents that are

  • contrasting phenotypically. For this example we see that

  • grandparents that are homozygous for upper case alleles at

  • markers across a given linkage group appear to be associated with small

  • stature and trees homozygous for lower case alleles

  • seem to be of large stature. The F1 offspring of this

  • cross are intermediate in size, suggesting that the locus that

  • appears to be affecting tree size must be exhibiting additive gene

  • action (i.e. heterozygotes are intermediate

  • to either homozygote). In the segregating F2

  • generation, one can test mean tree size of all three marker genotypic

  • classes to determine if they vary from one another.

  • In this case, only locus B appears to show a relationship

  • between tree size and genotypic class. The logical

  • interpretation is that the locus affecting tree size must

  • reside near the B marker. How close are they to one another?

  • They may be only a few thousand base pairs apart,

  • or they may be a few million base

  • pairs from one another. We can’t tell the difference at this point.

  • Remember from the genetic mapping module that mapping precision

  • is largely a function of how many meiotic events you have to look at.

  • As you will see, the confidence interval around

  • the location of a QTL is generally quite large.

  • Now image testing the genotypic classes of 75

  • markers spread across the genome for this same trait.

  • You may find no significant associations

  • or many. Whatever your result, if you have done the

  • experiment correctly, you can have some confidence that the result is a

  • reflection of the real situation for that one specific pedigreed cross.

  • This cartoon is a little more

  • illustrative of realistic data that come from QTL studies.

  • Again, the basic concepts of QTL mapping are shown here.

  • For simplicity, this is illustrated using F2 offspring

  • derived from the intermating of two inbred lines.

  • In terms of markers, only three genotypes are possible,

  • shown here as AA, AB,

  • and BB. Markers can be widely interspersed,

  • since recombination will be rare in a single generation.

  • Frequently, QTL studies are done with framework maps with

  • markers spaced 10-30 cM apart. Offspring

  • are grouped by genotype and their phenotypes are examined for

  • a significant difference among group means, such as using

  • ANOVA. In this case,

  • the AB (heterozygous) genotype is intermediate between the

  • two parental homozygotes, implying the QTL exhibits

  • additive gene action. The distribution of phenotypes

  • for the array of individuals with a given genotype clearly

  • suggests that the effect of that particular QTL on that phenotype

  • is relatively small, and that many other factors may be

  • influencing the trait.

  • Let’s do a quick overview of

  • QTL mapping. The idea is to find a statistically

  • meaningful association between genetic markers and phenotypic traits,

  • and to place the resultant QTL on a genetic map.

  • This is done using one full-sib family at a time.

  • To find an association, both the QTL locus

  • and the marker must be heterozygous in the cross chosen.

  • Imagine a trait that has a heritability of 0.5,

  • and it is controlled by ten genes, each of equal influence.

  • That is, each gene or QTL, accounts

  • for 5% of the total phenotypic variance for that trait since

  • half the variance is caused by non-genetic or rather,

  • environmental factors. It may be that the

  • cross you are using is homozygous for seven of the ten QTL.

  • In that case, you would only detect three of them,

  • assuming the power of your experiment was sufficient.

  • Identifying and locating those QTL

  • that are heterozygous in your cross depends on several things.

  • Certainly, marker density is important, but not nearly

  • so much as the number of progeny sampled for several reasons we have

  • articulated previously. Early studies conducted with

  • relatively few progeny (say, under 100) were shown to

  • overestimate the size of the QTL effect and to underestimate

  • the number of QTL. As you might imagine, this

  • problem increases as the size of the QTL effect decreases.

  • While breeders had visions of identifying major genes with

  • large effects, the reality is that we have found most trait

  • effects to be very small (<5%).

  • QTL detection and estimation of effect size is also a

  • function of a number of interactions between the QTL and other loci

  • (i.e. epistatic effects) and environmental

  • conditions. Finally, we note there are a

  • few different analytical approaches to QTL mapping. We will spend the next

  • several slides discussing each of these approaches.

  • The simplest analytical approach to QTL

  • detection is the single-marker method, which, as the name implies,

  • is a statistical test of the association between phenotype

  • and genotype class one marker at a time.

  • If you have 75 markers distributed over 12 linkage groups,

  • you perform 75 different calculations. This

  • can be done using simple t-tests, or with very

  • sophisticated analysis of variance models that seek to

  • partition experimental variances as much as possible

  • (i.e. remove non-genetic sources of variance).

  • A statistically significant result

  • is evidence that a QTL has a map location somewhere near the marker,

  • though neither the distance to the marker nor the size of the QTL

  • effect can be estimated well. It is not necessary

  • to have a genetic map to use this approach, but having one greatly

  • increases the amount of information available to you. There

  • are other drawbacks to this approach. It does not differentiate

  • between one and multiple QTL when they exist on the same

  • linkage group. This may result in overestimating the size of the

  • QTL effect. Conversely, the magnitude of

  • QTL effect may be underestimated due to increasing,

  • but unknown, recombination between marker and QTL.

  • That is, the further the QTL is removed from the marker,

  • the lower the estimated effect of the QTL.

  • As noted, single marker testing is relatively simple

  • and can be done with t-tests, ANOVA, or simple regression.

  • However, it should be obvious that testing for a significant

  • association between discreet genotypic classes of

  • many marker loci and quantitative distributions of

  • one to many phenotypic traits can result in literally

  • hundreds of statistical tests. By chance alone,

  • some tests will prove significant, yielding false positive

  • QTL detection. Consequently, it is best to

  • impose a correction for multiple testing, such as the Bonferroni,

  • Scheffe, or other corrections of significance level available

  • in most statistical packages. This may be done at the

  • individual linkage group level or across the entire genome.

  • The latter is the more conservative measure.

  • In the figure shown above, which we will see again later in this module,

  • one can see that 19 individual markers on a single

  • linkage group have been tested for statistical significance.

  • As is common practice, significance tests are defined

  • by the LOD score. The LOD score, which stands

  • for the logarithm of odds (base 10), compares the likelihood

  • of obtaining the test data if the two loci are indeed

  • linked, to the likelihood of observing the same data

  • purely by chance. Large, positive LOD

  • scores favor the presence of linkage, whereas small or

  • negative LOD scored indicate that linkage is less likely.

  • A LOD of 2 suggests a probability

  • that an association this strong would occur by chance alone

  • 1 in 100 times; a score of 3,

  • 1 in 1000 times. With multiple testing,

  • LOD scores higher than 3 are typically embraced.

  • Here, only one of the 19 loci tested at the

  • genome wide level is considered significant,

  • though it would appear that many of them are suggestive of being

  • suggestive of being significant. More on this later.

  • As Rebecca Doerge points out, in the paper cited

  • in the previous slide, single marker analyses investigate

  • individual markers independently and without reference

  • to their position or order. When markers are placed in

  • genetic map order so that the relationship between markers are understood,

  • the additional genetic information gained from knowing these relationships

  • provides the necessary setting to address confounding

  • between QTL effect and location.

  • The interval mapping approach to detection and

  • location of QTL was developed by Lander and Botstein

  • to take advantage of this additional information. Interval

  • mapping addresses the key weaknesses of single marker analyses using

  • ANOVA: 1) inability to accurately

  • detect and locate a QTL, 2)

  • inability to accurately estimate the QTL effect, due to

  • recombination, and 3) inability to evaluate

  • individuals for which genotype data may be missing.

  • With interval mapping, each location in the genome is

  • posited, one at a time, as the location of a single

  • putative QTL. Generally this is done by

  • evaluating a relatively small region of the genome

  • at a time, 2 or 5 cM, the distance

  • chosen being somewhat dependent on the number of markers in your framework

  • map. The process accounts for missing genotypes by using

  • predicted genotypes, based on knowledge of the parents

  • of the cross being used and the other nearby markers.

  • The statistical estimators in interval

  • mapping are complex and have computationally demanding solutions.

  • They often use maximum likelihood procedures.

  • This figure, borrowed from Georges, illustrates the principles of

  • quantitative trait loci (QTL) interval mapping

  • using linear regression and an F2 cross. An

  • F2 population is generated by intercrossing

  • blueandredparental strains differing for a phenotype

  • of interest. The F2 population is genotyped

  • with a battery of genetic markers covering the genome at

  • regular intervals of ~10 cM, shown

  • as colored bars on the chromosomes of the F2 individuals.

  • Marker intervals areinterrogatedsuccessively

  • (seen with the black arrows) for the presence of a QTL.

  • For each interval

  • and for each F2 individual, one computes the probability

  • that the individual is homozygousred-red

  • (pRR), heterozygous

  • red-blue” (pRB), or homozygousblue-blue” (pBB),

  • using the observable genotypes at

  • flanking marker loci. The additive effect of a given

  • interval on the phenotype is estimated by regressing the phenotypes

  • on pRR-pBB, as

  • shown in the panels on the right. In the absence of a

  • QTL in the tested interval (e.g. interval

  • 1), the regression coefficient does not deviate

  • significantly from zero. In the presence of a QTL in the

  • corresponding interval (shown by the star in interval

  • four), the regression coefficient may deviate significantly from

  • zero. In this case, linear regression was used

  • to determine whether phenotypes in each group are significantly different.

  • Calculations can also be done using a maximum

  • likelihood approach, but maximum likelihood calculations are more

  • complicated and linear regression approximations have proven

  • to be adequate in many cases.

  • Interval mapping is very powerful, providing good estimates

  • of QTL location, QTL effect, and,

  • depending on the experimental design and population,

  • estimates of gene action. However, interval mapping

  • may not effectively deal with the situation in which two or more

  • QTL occur on the same chromosome, or possibly on separate

  • chromosomes. To do this, one must consider the

  • potential effects of other genomic regions.

  • Composite interval mapping was developed to better deal with such

  • conditions. In this method, one performs interval

  • mapping using subsets of marker loci, other than the ones

  • being directly tested, as covariates. These

  • markers serve as proxies for other potential QTLs to

  • increase the resolution of interval mapping, by accounting for linked

  • QTLs and reducing the residual variation. The

  • key problem with composite interval mapping (CIM) concerns the choice of

  • suitable marker loci to serve as covariates; once these have

  • been chosen, CIM turns the model selection problem

  • into a single-dimensional scan. Though CIM

  • is still not without issues, it is much more

  • robust to the existence of multiple QTL. In the situation

  • where a single QTL exists in a given genomic region,

  • interval mapping and composite interval mapping

  • provide equivalent results.

  • We return once again to this figure, which was borrowed from the Doerge

  • citation noted here. This figure is titled: “Choices

  • of analysis for quantitative trait locus mapping”.

  • It uses data from an analysis of mouse

  • chromosome 11 for the quantitative trait calledseverity

  • in a study of experimental allergic

  • encephalomyelitus (EAE)99.

  • Microsatellite markers were genotyped in 633 F2

  • mice that were followed for this study. QTL

  • analysis was carried out using QTL-Cartographer and several

  • different approaches: single-marker analysis using a t-test

  • (shown with black diamonds); interval mapping

  • (shown with a blue line); and composite interval mapping

  • (shown with a green line). The red line represents

  • the 95% significance level on the basis of 1,000

  • permutations of the phenotypic data. The

  • single-marker t-tests identify one significant marker

  • (D11Mit36).

  • Interval mapping locates four maximum

  • QTL locations on the logarithm of odds

  • (LOD) profile. Composite interval mapping finds two

  • significant QTL. The differences seen between the single-

  • marker analysis and interval and composite interval mapping,

  • are the result of information gained from the estimated genetic map.

  • The difference between interval mapping and composite

  • interval mapping is the result of composite interval mapping’s

  • use of a ‘windowor genomic region that allows other

  • effects that are outside the window, but associated with the quantitative trait,

  • to be eliminated from the analysis point under consideration.

  • The benefit of defining

  • a window is that the variation associated with the point of

  • analysis is confined to the QTL effects within the window

  • and not outside the window, thereby reducing the effects

  • of linked and ghost QTL. The result of

  • composite interval mapping is illustrated by elimination

  • of the two central (ghost) QTL. We should

  • briefly address the concept of the permutation

  • test here. A permutation test (also

  • called a randomization test, re-randomization test,

  • or an exact test) is a type of statistical

  • significance test in which the distribution of the

  • test statistic under the null hypothesis is obtained by

  • calculating all possible values of the test statistic

  • under rearrangements of the labels on the observed data

  • points. In other words, the method by which

  • treatments are allocated to subjects in an experimental design

  • is mirrored in the analysis of that design. If

  • the labels are exchangeable under the null hypothesis, then the

  • resulting tests yield exact significance

  • levels. Confidence intervals can then be

  • derived from the tests. The permutation test is an

  • approach taken to define the LOD score for statistical significance

  • when no other logical test statistic exists.

  • A number of QTL detection programs have been developed over the years and

  • they continue to add features and improve their algorithms for dealing with mapping concerns.

  • Many programs were developed originally to deal with

  • specific mating types like inbred lines.

  • One particular program was developed specifically for dealing with outbred tree pedigrees.

  • It was eventually released online as QTL Express,

  • though this model is now superseded

  • by an array of analytics tools under the title of GridQTL.

  • We conclude the first half of this module with a few summary

  • slides without further vocal interruption.

  • The concept of a QTL is not new.

  • Sax developed the theoretical basis for QTL mapping

  • in 1923, and the method was first demonstrated in

  • 1961 with bristle number in Drosophila.

  • It wasn’t until therecentdevelopment of plentiful

  • genetic markers that renewed interest in the approach took hold,

  • first in humans and subsequently in crops and animals.

  • With increasing attention to the potential of QTL

  • for marker-assisted selection and as diagnostic tools,

  • we began to ask other questions, such as those noted here.

  • Before moving on to address these questions,

  • it is important to point out at the level of genetic

  • resolution at which QTL operate. This can be done simplistically

  • with the diagram shown here. Linkage mapping

  • of QTL typically identifies one or a

  • few flanking markers within a few to many cM

  • of the gene of interest (the QTL).

  • QTL discovery in pedigreed crosses will

  • rarely, if ever, identify markers within the

  • QTL or the QTN (quantitative trait

  • nucleotide) itself.

  • Determining whether QTLs detected in controlled crosses

  • are accurately located requires that you know what

  • and where the actual gene controlling the trait resides.

  • This seems to pose a bit of a catch 22, so to

  • speak. However, in a small number of cases,

  • the candidate gene has been identified, along with its

  • location, and we can evaluate the accuracy

  • of the technique. In the figure shown here,

  • the position of a gene coding for gibberellin oxidase

  • (sd1) is shown for chromosome 1 in rice.

  • The gene results in semi-dwarfing, or height reduction.

  • QTL scans for plant height from

  • 160 recombinant inbred lines

  • (RILs) of the Bala Azucena mapping population

  • of rice are shown relative to the position of the

  • sd1 (semi-dwarfing) locus. Bala

  • has a mutant allele that maps to 176

  • cM on a given, known, linkage group in this

  • population. In different environments

  • (shown in this illustration by different color bars), plant height

  • QTLs explain 7.8 to 14.6%

  • of the variation and peaks occur

  • at 166, 171,

  • 173, and 183 cM

  • with a mean position of 173 cM.

  • The LOD confidence intervals

  • range from 10-18 cM in width.

  • As an example, for the drought treatment (blue),

  • the blue broken lines indicate the generation

  • of the LOD support interval. The position of the QTL

  • obtained by combining all data across all environments

  • (shown in orange) is 174 cM,

  • only 2 cM from the strong candidate gene.

  • In fact, for many crop and model plant species, the estimated QTL

  • location rather accurately reflects the true location

  • of the causal genes (0-3 cM).

  • In each of these cases, a great deal of time

  • and money went into identifying the causal gene so that these

  • comparisons were possible. In some, but not all cases,

  • the QTL mapping aided in locating the causal gene.

  • For positional cloning approaches to identifying candidate

  • genes, it is necessary to be within 0.3 cM

  • of the gene. This seldom occurs.

  • Keep in mind that a cM may contain anywhere from

  • 100,000 to 1 million or more base pairs,

  • and host several to 100 potential genes.

  • It is also important to note that the populations used for

  • these studies lend themselves to accurate mapping.

  • In outbred tree species, we simply do not have inbred lines

  • or few known causal genes and genome sequence/

  • physical maps that will allow us to make such determinations yet,

  • but we do know from mathematical calculations that our

  • confidence intervals around the estimated QTL are quite large

  • (10-15 cM).

  • Though mutations in single genes

  • have been shown to have very large phenotypic effects in

  • some studies, as in Falconer and MacKay (1996), these

  • are relatively rare cases and they almost always result in

  • deleterious fitness effects. As tree scientists

  • began their QTL investigations they envisioned finding genes

  • with major or moderate effect on traits of interest.

  • For the most part, these were not found, though the odd major

  • effect gene has been found in QTL studies where

  • hybrid crosses between two tree species were made.

  • In the figure shown here based on the accumulated results of

  • 14 QTL studies in rodents, a broad distribution

  • of allelic effects are noted, with an average effect

  • of around 3-4%. For conifer studies

  • conducted with appropriately large populations, QTL

  • effects for most economically important traits seldom exceed

  • 5% for any given locus, and average more in the

  • 1-3% range. Adaptive traits such

  • as bud flush timing or cold hardiness tend to

  • have higher proportions of their genetic variation explained.

  • Indeed, such traits also tend to have relatively

  • high heritabilities. It is important to note

  • that while single loci many explain only small proportions

  • of the phenotypic variance of a trait, the accumulated

  • proportion of variance for a trait, based on all QTL detected,

  • may be substantial.

  • We have briefly addressed the issues of the size of QTL

  • effects and the accuracy with which they may be mapped. We would now

  • like to talk about how many QTL are detected and how stable

  • or reliable they are. That is, do the same

  • QTL show up in the same populations in different years,

  • or under different field test conditions, or for that matter, in different

  • crosses? In the next few slides we will describe

  • a very complex set of experiments that attempted to address some

  • of these questions. The results shown here reflect

  • the efforts of many lab and field personnel invested over a

  • ten year period. The photo shown here is of a clonally

  • replicated QTL trial containing some 450

  • individual progeny, each replicated 12 times

  • via rooting cuttings, established on one of two field

  • test sites, each of approximately four acres in size.

  • As you can imagine, such tests are neither

  • simple nor inexpensive to establish, maintain, and evaluate.

  • We begin be describing the populations used for QTL

  • detection and mapping. Much of what we have described in previous

  • slides should be apparent here. This study used a three-

  • generation intercross that began with four grandparents that were

  • selected based on the trait of vegetative phenology.

  • That is, timing of bud flush, a relatively important

  • adaptive trait. F1 progeny of these crosses

  • were expected to be heterozygous for genes controlling bud flush.

  • A single progeny from each of these crosses was selected

  • and the two were inter-mated to produce segregating F2

  • progeny. The cross was made twice, once in 1991,

  • and again in 1994, to produce

  • independent cohorts. The first cohort, entitled the

  • detection population, consisted of over 250

  • progeny. The second population, called the verification

  • population, consisted of nearly 500

  • progeny. Both populations were clonally replicated

  • and planted on multiple field test sites.

  • In addition, the verification population was used in a series of

  • greenhouse trials that tested for QTL detection under carefully

  • controlled environmental conditions related to

  • chilling hours, greenhouse temperatures, daylength, and moisture

  • stress. Population sizes shown here reflect

  • fall-down due to mortality and/or missing

  • genotype and phenotype data.

  • For this experiment, 74 markers

  • that were distributed across the genome were selected.

  • This is equal to about one marker every 12 cM.

  • Depending on the cohort, this resulted in 15-17

  • linkage groups (LGs), which is a few more

  • than the 13 expected. Many growth and phenology

  • traits were measured, but our discussion will focus on bud flush,

  • a highly heritable trait in most trees

  • (heritability ~ 0.5). You will

  • see that bud flush was scored in field trials annually

  • for 6 years. Most analyses were

  • done with Haley-Knott’s multiple marker interval mapping approach

  • (similar to QTL Express), though

  • single marker analyses were conducted to look at potential

  • significant interaction effects.

  • For those of you interested

  • enough to spend time, there is a great deal of information

  • to be extracted from this slide. The framework genetic map

  • of Douglas-fir is outlined in green with

  • small lines indicating location of the 72

  • dispersed markers. The alternating green hues

  • represent 10 cM segments for each

  • linkage group. An array of red and black

  • lines and notations appear for many of the linkage

  • groups. These are putative QTL detections

  • for the detection and verification

  • Douglas-fir populations, respectively.

  • Each of these populations was established in field trials

  • in Washington (denoted by a W) and Oregon

  • (O). Bud burst, along

  • with other traits, was subsequently measured for several years.

  • In some years, flush was measured

  • separately for the terminal bud (labeled TR)

  • and the lateral buds (LT);

  • in other years it was simply measured

  • as an average over the whole tree (denoted

  • as FL for flush).

  • Let’s look closely at linkage group 4.

  • There appear to be three distinct regions of the

  • linkage group that possess QTL (these are located in

  • the top, middle, and bottom) for the detection population.

  • Generally speaking, detections located

  • within 10-15 cM of each other are

  • considered to represent a single QTL location.

  • Each notation here indicates

  • an independent QTL detection for a trait

  • and year combination. An asterisk

  • implies significance, otherwise

  • the location is only suggestive (p=0.05).

  • A notation that reads WLT 5

  • means that a putative QTL for

  • lateral bud flush in the Washington test was found in

  • 1995. That should help you identify

  • most of the other notations, except for those that denote

  • interaction effects. For instance,

  • OQY or

  • WQY indicate

  • a QTL by year interaction for the Washington

  • or Oregon sites at that map location

  • and QS indicates a QTL

  • by site interaction. Sites with many notations

  • suggest a single QTL exists and

  • that it is being detected multiple times. This

  • is strong verification that the QTL is real.

  • A smaller array of black notations

  • represent QTL detected in the verification

  • population. In the best of worlds, one would

  • expect complete overlap between red and black

  • QTL detections. Obviously, such is

  • not the case. Fewer QTL were detected

  • in the verification population.

  • Given that the verification population was significantly

  • larger than the detection population the expectation

  • was that more QTL would be observed there.

  • How might we explain such unexpected results?

  • Perhaps it was the environment of

  • the study sites. The detection population in

  • Washington State was established on a site very favorable

  • to growth under mild conditions, which may have favorably

  • influenced gene expression.

  • What can we take home from this complicated illustration of real

  • data? First, there appear to be

  • many detectable QTL for the bud burst trait

  • and they are scattered throughout the genome. Second,

  • within cohorts, most QTL are verified

  • by repeated detections over years and field sites.

  • Third, between cohorts,

  • verification of QTL sites was slightly less than

  • 50%. Of course,

  • this effect was confounded a bit by having two entirely new

  • and different field sites and greenhouse conditions.

  • So are all these putative QTL regions real?

  • Maybe, but impossible to say for

  • sure. What is clear is that even this

  • moderately heritable trait appears to be controlled

  • by many genes, each with modest effect.

  • Oh boy, you say.

  • I thought the last slide was bad. There is

  • much more to talk about here also, so let’s begin

  • by describing the big picture. The authors have once again

  • illustrated QTL detection for the trait bud flush,

  • this time in three separate experiments

  • all conducted with the verification population of Douglas fir

  • described earlier. These experiments,

  • outlined in the earlier population slide, were

  • a) Row 1 - greenhouse conditions,

  • with varying chill hours and flushing temperatures,

  • b) Row 2 - potted outdoor trees

  • grown under normal and extended daylength

  • and different levels of moisture stress, and c)

  • Row 3 - planted field conditions, at multiple sites.

  • Now let’s describe the illustration.

  • Each row views the entire genome

  • by moving from linkage group 1 on the left

  • to linkage group 15 on the right. Colored

  • lines are plotted F values, with significance

  • levels denoted by horizontal black lines,

  • for each of 15 linkage groups in Douglas-fir.

  • Different colors denote different experimental

  • conditions, as noted in the keys.

  • Colored lines are a function of interval mapping approaches to

  • analysis. Along the top line of each row

  • you will see letters and symbols which represent

  • single marker QTL detection results including interactions.

  • So, what do the data tell us?

  • First, it appears that often different QTL

  • are expressed in different environmental conditions.

  • This would imply that selection for a QTL in

  • one environment may not be particularly predictive of outcome

  • in another environment. Second,

  • across experiments, at least two linkage groups

  • (2 and 12) expressed QTL

  • consistently. So, some QTL

  • do appear to be relatively stable and reliable and

  • probably represent relatively important genes in the

  • biochemistry of growth rhythm. Also evident is

  • that, even with these excellent studies and populations,

  • interpreting the genetic basis of complex traits can be overwhelmingly

  • difficult. And these results are for

  • one cross only. How many QTL may

  • exist for this trait that were not segregating in this population?

  • Let’s look at

  • one last Douglas-fir QTL mapping slide to illustrate

  • a few more points. In this partial map

  • of three linkage groups, QTL are shown for bud

  • flush and a suite of new traits; cold

  • hardiness, as evaluated by freeze testing in the lab.

  • This was done both for spring and fall cold

  • hardiness in cohort one (detection population)

  • and for spring cold hardiness in cohort two.

  • Cold hardiness was done for three different

  • tissue types: buds, needles, and stems.

  • First, let’s interpret the results.

  • In cohort one it appears the same or very closely linked

  • QTL for cold hardiness were detected for different tissues.

  • Only one cold hardiness QTL detected

  • in cohort one was verified in cohort two.

  • Finally, on linkage group 4,

  • we see a rather strange co-detection

  • of three QTL for bud flush and fall

  • bud cold hardiness. Strange in that it

  • is difficult to explain metabolically.

  • The second important point to make here is how QTL maps may

  • play a role in identifying positional candidate genes.

  • You will see on the map several markers highlighted

  • by bold, blue type. These represent

  • polymorphisms in genes with known function as determined

  • in other species. Many of these genes

  • fall within the confidence intervals of the QTL shown here.

  • Their known function indicates they could play a role in the

  • phenotypes under study. Fine mapping with more

  • markers and more progeny could better define the proximal

  • location of QTL and candidate gene, but the

  • process of chromosome walking to make a final determination

  • is costly and time-consuming, and not always possible.

  • The ultimate value of this technology is probably

  • in identifying candidate genes for consideration in

  • another type of complex trait dissection: association

  • genetics, which we will discuss in the next module.

  • This final QTL/linkage map is intended to illustrate how well QTL are

  • verified across genetic backgrounds. In this

  • case, we are looking at QTL for wood property traits

  • in loblolly pine. It is not terribly

  • important what the specific traits are here. What is of interest

  • is whether the same trait was found in different populations.

  • We looked for these traits in two cohorts of the same

  • cross (listed as detection and verification populations),

  • in a related cross that had one parent in common,

  • and in an entirely unrelated cross.

  • A couple of observations seem apparent. First,

  • QTL for several traits seem to co-locate

  • in the same genomic region in more than one instance.

  • This could be evidence of pleiotropy or simply that we

  • were measuring the same trait in different ways. Second,

  • QTL detection drops off slightly for the related cross,

  • but quite dramatically for the unrelated cross.

  • To be sure, the latter was represented by a relatively

  • small population size, but the implication is that

  • QTL found in one genetic background are not necessarily

  • to be found in another. This has serious implications

  • for applicability in practical breeding programs.

  • So let’s take a high elevation

  • look at QTL mapping and what we have learned by using it in forest

  • trees. Undeniably, QTL mapping

  • is an excellent method for identifying the genetic architecture of

  • complex traits. It does so by conducting a whole

  • genome scan for linkage group regions that are associated with

  • phenotypic trait variation, using relatively few and

  • well-placed markers. Specifically, a well-designed

  • QTL study can reveal, for one or more traits simultaneously,

  • how many QTL exist, the location of those

  • QTL, and the size of their effect. You can determine

  • what type of gene action is in play, parental contribution of

  • allelic effects, and whether QTL by environment

  • interactions exist. For the tree breeder, they potentially

  • provide a foundation for conducting marker-aided selection.

  • And for those interested in functional genomics,

  • they can identify positional candidate genes.

  • Clearly, this is a powerful tool. In the next few

  • slides we will do a final dissection of the process.

  • Twenty years ago,

  • when we started the studies mentioned here, we did not know if trees had

  • QTL or if so, whether they could be detected.

  • We now know they do: they have been found for virtually

  • every trait studied in every species studied.

  • The range in number of QTL detected per trait in our studies

  • was typically between three and ten, but fewer or more occurred

  • occasionally. We learned, in large part as a result of

  • studies by William Beavis, that population size has

  • a huge effect on the quality of a QTL study. Clonal

  • studies improve the chances of detecting QTL by

  • increasing the heritability of the traits studied. Our early hopes,

  • that traits would be controlled oligogenically, or

  • by few major loci, were dashed, but we found that,

  • at times, good studies identify many genes with

  • large cumulative effects.

  • Though dozens of QTL studies

  • have been conducted in trees, only a handful have ever

  • attempted to verify QTL in time, space or

  • genetic background. For those few studies that have looked at

  • verification (some of which were reviewed here), a highly

  • variable pattern of QTL stability and expression is

  • observed. The results are at the same time encouraging and

  • disheartening, particularly for the applied tree breeder.

  • We conclude with a brief discussion of challenges facing those who wish to draw

  • inferences from QTL mapping.

  • As we have alluded to in this module, many challenges exist.

  • From a practical standpoint, QTL stability is a major concern.

  • For trees growing in highly heterogenous conditions, over decades or centuries,

  • QTL by environment interactions appear to be significant.

  • Coupled with our lack of understanding of pleiotropy and epistasis,

  • this makes the predictability of QTL effects suspect.

  • But the single largest drawback to QTL mapping, from an applied standpoint,

  • is the genetic basis for detectable associations between marker and phenotypes.

  • QTL mapping relies on linkage disequilibrium between marker and QTL alleles

  • generated by only one or two generations of crossing.

  • That is, marker allele 1 may be associated with QTL allele 1 in the current progeny,

  • but unless the two are very tightly linked,

  • the linkage phase between the two may change in a relatively few generations.

  • For that matter, linkage phase is almost as likely to be reversed in other crosses,

  • simply due to the probability of a crossover event occurring between marker and QTL

  • over many generations since the mutation first occurred.

  • Though we have largely avoided discussions about linkage disequilibrium to this point,

  • it will be a focus of the next module on association genetics.

As has been pointed out in previous

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B2 中高級

模塊9:定量性狀位點(QTL)的繪製--CTGN。 (Module 9: Mapping Quantitative Trait Loci (QTL) - CTGN)

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    Morris Du 發佈於 2021 年 01 月 14 日
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