This vignette demonstrates the implementation of supervised learning in ecological and evolutionary inference. In this vignette, we take the microsatellite genotypes of 15 cattle breeds (Laloë et al. 2007) as an example. We aim to use different supervised leaning techniques to identify the population structure of 15 cattle breeds.
We use the microsatellite genotypes of 15 cattle breeds (Laloë et al. 2007) as an example to show population structure inference and visualization. We compare six approaches that are feasible and suitable for population structure inference here. We use the commonly used unsupervised learning technique, PCA, as the benchmark. We demonstrate how to use these five supervised learning approaches, including DAPC, LFDAPC, LFDA, LFDAKPC, and KLFDA, to identify population structure. These five supervised learning techniques are all from the same discriminant family.
First, we need to install and load the package.
knitr::opts_chunk$set( collapse = TRUE, comment = "#>" )
#Install from CRAN #install.packages("DA") ## or you can get the latest version of HierDpart from github #library(devtools) #install_github("xinghuq/DA") library("DA") library("kernlab")
# example genepop file f <- system.file('extdata',package='DA') infile <- file.path(f, "Cattle_breeds_allele_frequency.csv") Cattle_pop=file.path(f, "Cattle_pop.csv") cattle_geno=read.csv(infile,h=T) cattle_pop=read.csv(Cattle_pop,h=T)
PCA is still one of the most commonly used approaches to study population structure. However, PCs represent the global structure of the data without consideration of variation within classes.
cattle_pop$x=factor(cattle_pop$x,levels = unique(cattle_pop$x)) ### PCA cattle_pc=princomp(cattle_geno[,-1]) #plot the data projection on the components library(plotly) cols=rainbow(length(unique(cattle_pop$x))) p0 <- plot_ly(as.data.frame(cattle_pc$scores), x =cattle_pc$scores[,1], y =cattle_pc$scores[,2], color = cattle_pop$x,colors=cols[cattle_pop$x],symbol = cattle_pop$x,symbols = 1:15L) %>% add_markers() %>% layout(scene = list(xaxis = list(title = 'PC1'), yaxis = list(title = 'PC2'))) p0
Fig.1 PCA plot of 15 cattle breeds.
Using DAPC to display the pop structure is a common means in population genetics. This can be achieved through "adegenet" package.
library(adegenet) cattle_pop$x=factor(cattle_pop$x,levels = unique(cattle_pop$x)) ###DAPC cattle_dapc=dapc(cattle_geno[,-1],grp=cattle_pop$x,n.pca=10, n.da=3) #plot the data projection on the components library(plotly) cols=rainbow(length(unique(cattle_pop$x))) p1 <- plot_ly(as.data.frame(cattle_dapc$ind.coord), x =cattle_dapc$ind.coord[,1], y =cattle_dapc$ind.coord[,2], color = cattle_pop$x,colors=cols[cattle_pop$x],symbol = cattle_pop$x,symbols = 1:15L) %>% add_markers() %>% layout(scene = list(xaxis = list(title = 'LDA1'), yaxis = list(title = 'LDA2'))) p1
Fig.2 DAPC plot of 15 cattle breeds. This is an interactive plot that allows you to point the data values and display the value as you wish.
Discriminant analysis of kernel principal components (DAKPC) is a variant of DAPC. However, people try to incorporate the non-linear relationship between loci and samples, so that the kernel principal component analysis is emolyed to achieve this goal. Below is the implementation of DAKPC.
cattle_ldakpc=LDAKPC(cattle_geno[,-1],cattle_pop$x,n.pc=3) cols=rainbow(length(unique(cattle_pop$x))) p2 <- plot_ly(as.data.frame(cattle_ldakpc$LDs), x =cattle_ldakpc$LDs[,1], y =cattle_ldakpc$LDs[,2], color = cattle_pop$x,colors=cols[cattle_pop$x],symbol = cattle_pop$x,symbols = 1:15L) %>% add_markers() %>% layout(scene = list(xaxis = list(title = 'LDA1'), yaxis = list(title = 'LDA2'))) p2
Fig.3 LDAKPC plot of 15 cattle breeds.
LDAKPC has the similar result with DAPC.
In comparison to LDA, LFDA not only considers the variation between classes, but also the variation within classes. Thus, LFDA can discriminate the multimodal data while LDA can not. LFDA is an upgraded version of LDA.
cattle_lfda=LFDA(cattle_geno[,-1],cattle_pop$x,r=3,tol=1E-3) cols=rainbow(length(unique(cattle_pop$x))) p3 <- plot_ly(as.data.frame(cattle_lfda$Z), x =cattle_lfda$Z[,1], y =cattle_lfda$Z[,2], color = cattle_pop$x,colors=cols[cattle_pop$x],symbol = cattle_pop$x,symbols = 1:15L) %>% add_markers() %>% layout(scene = list(xaxis = list(title = 'LDA1'), yaxis = list(title = 'LDA2'))) p3
Fig.4 LFDA plot of 15 cattle breeds.
As LFDA is more advanced than LDA, I adopt LFDA for discriminant analysis on the basis of LDAKPC. Now we get LFDAKPC, Local (Fisher) Discriminant Analysis of Kernel Principal Components (LFDAKPC). Below is the implementation of LFDAKPC.
cattle_lfdakpc=LFDAKPC(cattle_geno[,-1],cattle_pop$x,n.pc=3,tol=1E-3) cols=rainbow(length(unique(cattle_pop$x))) p4 <- plot_ly(as.data.frame(cattle_lfdakpc$LDs), x =cattle_lfdakpc$LDs[,1], y =cattle_lfdakpc$LDs[,2], color = cattle_pop$x,colors=cols[cattle_pop$x],symbol = cattle_pop$x,symbols = 1:15L) %>% add_markers() %>% layout(scene = list(xaxis = list(title = 'LDA1'), yaxis = list(title = 'LDA2'))) p4
Fig.5 LFDAKPC plot of 15 cattle breeds.
The LFDAKPC also produces the similar results as LDAKPC and DAPC.
Kernel local (Fisher) discriminant analysis (KLFDA) is a kernelized version of local Fisher discriminant analysis (LFDA). KLFAD can capature the non-linear relationships between samples. It was reported that the discrimintory power of KLFDA was significantly improved compared to LDA.
cattle_klfda=KLFDA(as.matrix(cattle_geno[,-1]),as.factor(cattle_pop$x),r=3,tol=1E-10,prior = NULL) cols=rainbow(length(unique(cattle_pop$x))) p5 <- plot_ly(as.data.frame(cattle_klfda$Z), x =cattle_klfda$Z[,1], y =cattle_klfda$Z[,2], color = cattle_pop$x,colors=cols[cattle_pop$x],symbol = cattle_pop$x,symbols = 1:15L) %>% add_markers() %>% layout(scene = list(xaxis = list(title = 'LDA1'), yaxis = list(title = 'LDA2'))) p5
Fig.6 KLFDA plot of 15 cattle breeds.
KLFDA seems present the aggregates that are more convergent than the above methods.
All the above methods show the same global structure for 15 cattle breeds.
Kernel local (Fisher) discriminant analysis (KLFDA) is the optimal approach for population structurte inference when tested using this cattle data. Now, we plot the cattle individual membership representing the posterior possibilities of individuals as the population structure. This gives the similar plot produced from STRUCTURE software.
library(adegenet) ## asignment plot compoplot(as.matrix(cattle_klfda$bayes_assigment$posterior),show.lab = TRUE, posi=list(x=5,y=-0.01),txt.leg = unique(cattle_pop$x))
Fig. 7 The population structure of Cattle breeds (individual assignment)
More tutorials can be found at URL: https://xinghuq.github.io/DA/articles/index.html.
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