bch441-work-abc-units/BIN-PHYLO-Tree_analysis.R
2019-01-08 17:11:25 +10:00

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R

# BIN-PHYLO-Tree_analysis.R
#
# Purpose: A Bioinformatics Course:
# R code accompanying the BIN-PHYLO-Tree_analysis unit.
#
# Version: 1.1
#
# Date: 2017 10 - 2019 01
# Author: Boris Steipe (boris.steipe@utoronto.ca)
#
# Versions:
# 1.1 Change from require() to requireNamespace(),
# use <package>::<function>() idiom throughout,
# use Biocmanager:: not biocLite()
# 1.0.2 Typo in variable name, style changes
# 1.0.1 Wrong section heading
# 1.0 First 2017 version
# 0.1 First code copied from 2016 material.
#
#
# TODO:
#
#
# == DO NOT SIMPLY source() THIS FILE! =======================================
#
# If there are portions you don't understand, use R's help system, Google for an
# answer, or ask your instructor. Don't continue if you don't understand what's
# going on. That's not how it works ...
#
# ==============================================================================
#TOC> ==========================================================================
#TOC>
#TOC> Section Title Line
#TOC> --------------------------------------------------
#TOC> 1 Preparation and Tree Plot 46
#TOC> 2 Tree Analysis 86
#TOC> 2.1 Rooting Trees 145
#TOC> 2.2 Rotating Clades 190
#TOC> 2.3 Computing tree distances 241
#TOC>
#TOC> ==========================================================================
# = 1 Preparation and Tree Plot ===========================================
if (! requireNamespace("ape", quietly = TRUE)) {
install.packages("ape")
}
# Package information:
# library(help = ape) # basic information
# browseVignettes("ape") # available vignettes
# data(package = "ape") # available datasets
# Read the species tree that you have created at the phyloT Website:
fungiTree <- ape::read.tree("fungiTree.txt")
plot(fungiTree)
# The tree produced by phyloT contains full length species names, but it would
# be more convenient if it had bicodes instead.
str(fungiTree)
# The species names are in a vector $tip.label of this list. We can use bicode()
# to shorten them - but note that they have underscores as word separators. Thus
# we will use gsub("-", " ", ...) to replace the underscores with spaces.
for (i in seq_along(fungiTree$tip.label)) {
fungiTree$tip.label[i] <- biCode(gsub("_", " ", fungiTree$tip.label[i]))
}
# Plot the tree
plot(fungiTree, cex = 1.0, root.edge = TRUE, no.margin = TRUE)
ape::nodelabels(text = fungiTree$node.label,
cex = 0.6,
adj = 0.2,
bg = "#D4F2DA")
# Note that you can use the arrow buttons in the menu above the plot to scroll
# back to plots you have created earlier - so you can reference back to the
# species tree.
# = 2 Tree Analysis =======================================================
# 1.1 Visualizing your tree
# The trees that are produced by Rphylip are stored as an object of class
# "phylo". This is a class for phylogenetic trees that is widely used in the
# community, practically all R phylogenetics packages will options to read and
# manipulate such trees. Outside of R, a popular interchange format is the
# Newick_format that you have seen above. It's easy to output your calculated
# trees in Newick format and visualize them elsewhere.
# The "phylo" class object is one of R's "S3" objects and methods to plot and
# print it have been defined with the Rphylip package, and in ape. You can
# simply call plot(<your-tree>) and R knows what to do with <your-tree> and how
# to plot it. The underlying function is plot.phylo(), and documentation for its
# many options can by found by typing:
?plot.phylo
# We load the APSES sequence tree that you produced in the
# BIN-PHYLO-Tree_building unit:
load(file = "APSEStreeRproml.RData")
plot(apsTree) # default type is "phylogram"
plot(apsTree, type = "unrooted")
plot(apsTree, type = "fan", no.margin = TRUE)
# rescale to show all of the labels:
# record the current plot parameters by assigning them to a variable ...
(tmp <- plot(apsTree, type="fan", no.margin = TRUE, plot=FALSE))
# ... and adjust the plot limits for a new plot:
plot(apsTree,
type = "fan",
x.lim = tmp$x.lim * 1.8,
y.lim = tmp$y.lim * 1.8,
cex = 0.8,
no.margin = TRUE)
# Inspect the tree object
str(apsTree)
apsTree$tip.label
apsTree$edge
apsTree$edge.length
# show the node / edge and tip labels on a plot
plot(apsTree)
ape::nodelabels()
ape::edgelabels()
ape::tiplabels()
# show the number of nodes, edges and tips
ape::Nnode(apsTree)
ape::Nedge(apsTree)
ape::Ntip(apsTree)
# Finally, write the tree to console in Newick format
ape::write.tree(apsTree)
# == 2.1 Rooting Trees =====================================================
# In order to analyse the tree, it is helpful to root it first and reorder its
# clades. Contrary to documentation, Rproml() returns an unrooted tree.
ape::is.rooted(apsTree)
# You can root the tree with the command root() from the "ape" package.
plot(apsTree)
# add labels for internal nodes and tips
ape::nodelabels(cex = 0.5, frame = "circle")
ape::tiplabels(cex = 0.5, frame = "rect")
# The outgroup of the tree is tip "11" in my sample tree, it may be a different
# number in yours. Substitute the correct node number below for "outgroup".
apsTree <- ape::root(apsTree, outgroup = 11, resolve.root = TRUE)
plot(apsTree)
ape::is.rooted(apsTree)
# This tree _looks_ unchanged, beacuse when the root trifurcation was resolved,
# an edge of length zero was added to connect the MRCA (Most Recent Common
# Ancestor) of the ingroup.
# The edge lengths are stored in the phylo object:
apsTree$edge.length
# ... and you can assign a small arbitrary value to the edge
# to show how it connects to the tree without having an
# overlap.
apsTree$edge.length[1] <- 0.1
plot(apsTree, cex = 0.7)
ape::nodelabels(text = "MRCA", node = 12, cex = 0.5, adj = 0.1, bg = "#ff8866")
# This procedure does however not assign an actual length to a root edge, and
# therefore no root edge is visible on the plot. Why? , you might ask. I ask
# myself that too. We'll just add a length by hand.
apsTree$root.edge <- mean(apsTree$edge.length) * 1.5
plot(apsTree, cex = 0.7, root.edge = TRUE)
ape::nodelabels(text = "MRCA", node = 12, cex = 0.5, adj = 0.8, bg = "#ff8866")
# == 2.2 Rotating Clades ===================================================
# To interpret the tree, it is useful to rotate the clades so that they appear
# in the order expected from the cladogram of species.
# We can either rotate around individual internal nodes ...
layout(matrix(1:2, 1, 2))
plot(apsTree, no.margin = TRUE, root.edge = TRUE)
ape::nodelabels(node = 13, cex = 0.7, bg = "#ff8866")
plot(ape::rotate(apsTree, node = 13), no.margin = TRUE, root.edge = TRUE)
ape::nodelabels(node = 13, cex = 0.7, bg = "#88ff66")
# Note that the species at the bottom of the clade descending from node
# 17 is now plotted at the top.
layout(matrix(1), widths = 1.0, heights = 1.0)
# ... or we can plot the tree so it corresponds as well as possible to a
# predefined tip ordering. Here we use the ordering that phyloT has returned
# for the species tree.
# (Nb. we need to reverse the ordering for the plot. This is why we use the
# expression [nOrg:1] below instead of using the vector directly.)
nOrg <- length(apsTree$tip.label)
layout(matrix(1:2, 1, 2))
plot(fungiTree,
no.margin = TRUE, root.edge = TRUE)
ape::nodelabels(text = fungiTree$node.label,
cex = 0.5,
adj = 0.2,
bg = "#D4F2DA")
plot(ape::rotateConstr(apsTree, apsTree$tip.label[nOrg:1]),
no.margin = TRUE,
root.edge = TRUE)
ape::add.scale.bar(length = 0.5)
layout(matrix(1), widths = 1.0, heights = 1.0)
# Task: Study the two trees and consider their similarities and differences.
# What do you expect? What do you find? Note that this is not a "mixed"
# gene tree yet, since it contains only a single gene for the species
# we considered. All of the branch points in this tree are speciation
# events. Thus the gene tree should have the same topology as the
# species tree. Does it? Are the differences important? How many
# branches would you need to remove and reinsert elsewhere to get the
# same topology as the species tree?
# In order to quantiofy how different these tow trees are, we need to compute
# tree distances.
# == 2.3 Computing tree distances ==========================================
# Many superb phylogeny tools are contributed by the phangorn package.
if (! requireNamespace("phangorn", quietly = TRUE)) {
install.packages("phangorn")
}
# Package information:
# library(help = phangorn) # basic information
# browseVignettes("phangorn") # available vignettes
# data(package = "phangorn") # available datasets
# To compare two trees, they must have the same tip labels. We delete "MBP1_" or
# "KILA_" from the existing tip labels in a copy of our APSES domain tree.
apsTree2 <- apsTree
apsTree2$tip.label <- gsub("(MBP1_)|(KILA_)", "", apsTree2$tip.label)
# phangorn provides several functions to compute tree-differences (and there
# is a _whole_ lot of theory on how to compare trees). treedist() returns the
# "symmetric difference"
phangorn::treedist(fungiTree, apsTree2, check.labels = TRUE)
# Numbers. What do they mean? How much more similar is our apsTree to the
# (presumably) ground truth of fungiTree than a random tree would be?
# The ape package provides the function rtree()
# to compute random trees.
ape::rtree(n = length(apsTree2$tip.label), # number of tips
rooted = TRUE, # we rooted the tree above,
# and fungiTree is rooted anyway
tip.label = apsTree2$tip.label, # use the apsTree2 labels
br = NULL) # don't generate branch lengths since
# fungiTree has none, so we can't
# compare them anyway.
# Let's compute some random trees this way, calculate the distances to
# fungiTree, and then compare the values we get for apsTree2. The random
# trees are provided by ape::rtree().
N <- 10000 # takes about 15 seconds
myTreeDistances <- matrix(numeric(N * 2), ncol = 2)
colnames(myTreeDistances) <- c("symm", "path")
set.seed(112358)
for (i in 1:N) {
xTree <- ape::rtree(n = length(apsTree2$tip.label),
rooted = TRUE,
tip.label = apsTree2$tip.label,
br = NULL)
myTreeDistances[i, ] <- phangorn::treedist(fungiTree, xTree)
}
set.seed(NULL) # reset the random number generator
table(myTreeDistances[, "symm"])
(symmObs <- phangorn::treedist(fungiTree, apsTree2)[1])
# Random events less-or-equal to observation, divided by total number of
# events gives us the empirical p-value.
cat(sprintf("\nEmpirical p-value for symmetric diff. of observed tree is %1.4f\n",
(sum(myTreeDistances[ , "symm"] <= symmObs) + 1) / (N + 1)))
hist(myTreeDistances[, "path"],
col = "aliceblue",
main = "Distances of random Trees to fungiTree")
(pathObs <- phangorn::treedist(fungiTree, apsTree2)[2])
abline(v = pathObs, col = "chartreuse")
# Random events less-or-equal to observation, divided by total number of
# events gives us the empirical p-value.
cat(sprintf("\nEmpirical p-value for path diff. of observed tree is %1.4f\n",
(sum(myTreeDistances[ , "path"] <= symmObs) + 1) / (N + 1)))
# Indeed, our apsTree is _very_ much more similar to the species tree than
# we would expect by random chance.
# What do we gain from that analysis? Analyzing the tree we get from a single
# gene of orthologous sequences is a positive control in our computational
# experiment. If these genes are indeed orthologues, a correct tree-building
# program ought to give us a tree that exactly matches the species tree.
# Evaluating how far off we are from the known correct result gives us a way to
# validate our workflow and our algorithm. If we can't get that right, we can't
# expect to get "real" data right either. Employing such positive controls in
# every computational experiment is essential for research. Not doing so is
# Cargo Cult Bioinformatics.
# [END]