NAME

Bio::Tree::Compatible - Testing compatibility of phylogenetic trees with nested taxa.

SYNOPSIS

use Bio::Tree::Compatible;
use Bio::TreeIO;
my $input = Bio::TreeIO->new('-format' => 'newick',
                             '-file'   => 'input.tre');
my $t1 = $input->next_tree;
my $t2 = $input->next_tree;

my ($incompat, $ilabels, $inodes) = Bio::Tree::Compatible::is_compatible($t1,$t2);
if ($incompat) {
  my %cluster1 = %{ Bio::Tree::Compatible::cluster_representation($t1) };
  my %cluster2 = %{ Bio::Tree::Compatible::cluster_representation($t2) };
  print "incompatible trees\n";
  if (scalar(@$ilabels)) {
    foreach my $label (@$ilabels) {
      my $node1 = $t1->find_node(-id => $label);
      my $node2 = $t2->find_node(-id => $label);
      my @c1 = sort @{ $cluster1{$node1} };
      my @c2 = sort @{ $cluster2{$node2} };
      print "label $label";
      print " cluster"; map { print " ",$_ } @c1;
      print " cluster"; map { print " ",$_ } @c2; print "\n";
    }
  }
  if (scalar(@$inodes)) {
    while (@$inodes) {
      my $node1 = shift @$inodes;
      my $node2 = shift @$inodes;
      my @c1 = sort @{ $cluster1{$node1} };
      my @c2 = sort @{ $cluster2{$node2} };
      print "cluster"; map { print " ",$_ } @c1;
      print " properly intersects cluster";
      map { print " ",$_ } @c2; print "\n";
    }
  }
} else {
  print "compatible trees\n";
}

DESCRIPTION

NB: This module has exclusively class methods that work on Bio::Tree::TreeI objects. An instance of Bio::Tree::Compatible cannot itself represent a tree, and so typically there is no need to create one.

Bio::Tree::Compatible is a Perl tool for testing compatibility of phylogenetic trees with nested taxa represented as Bio::Tree::Tree objects. It is based on a recent characterization of ancestral compatibility of semi-labeled trees in terms of their cluster representations.

A semi-labeled tree is a phylogenetic tree with some of its internal nodes labeled, and it can represent a classification tree as well as a phylogenetic tree with nested taxa, with labeled internal nodes corresponding to taxa at a higher level of aggregation or nesting than that of their descendents.

Two semi-labeled trees are compatible if their topological restrictions to the common labels are such that for each node label, the smallest clusters containing it in each of the trees coincide and, furthermore, no cluster in one of the trees properly intersects a cluster of the other tree.

Future extensions of Bio::Tree::Compatible include a Bio::Tree::Supertree module for combining compatible phylogenetic trees with nested taxa into a common supertree.

FEEDBACK

Mailing Lists

User feedback is an integral part of the evolution of this and other Bioperl modules. Send your comments and suggestions preferably to the Bioperl mailing list. Your participation is much appreciated.

bioperl-l@bioperl.org                  - General discussion
http://bioperl.org/wiki/Mailing_lists  - About the mailing lists

Support

Please direct usage questions or support issues to the mailing list:

bioperl-l@bioperl.org

rather than to the module maintainer directly. Many experienced and reponsive experts will be able look at the problem and quickly address it. Please include a thorough description of the problem with code and data examples if at all possible.

Reporting Bugs

Report bugs to the Bioperl bug tracking system to help us keep track of the bugs and their resolution. Bug reports can be submitted via the web:

https://github.com/bioperl/bioperl-live/issues

SEE ALSO

  • Philip Daniel and Charles Semple. Supertree Algorithms for Nested Taxa. In: Olaf R. P. Bininda-Emonds (ed.) Phylogenetic Supertrees: Combining Information to Reveal the Tree of Life, Computational Biology, vol. 4, chap. 7, pp. 151-171. Kluwer (2004).

  • Charles Semple, Philip Daniel, Wim Hordijk, Roderic D. M. Page, and Mike Steel: Supertree Algorithms for Ancestral Divergence Dates and Nested Taxa. Bioinformatics 20(15), 2355-2360 (2004).

  • Merce Llabres, Jairo Rocha, Francesc Rossello, and Gabriel Valiente: On the Ancestral Compatibility of Two Phylogenetic Trees with Nested Taxa. J. Math. Biol. 53(3), 340-364 (2006).

AUTHOR - Gabriel Valiente

Email valiente@lsi.upc.edu

APPENDIX

The rest of the documentation details each of the object methods.

postorder_traversal

Title   : postorder_traversal
Usage   : my @nodes = @{ $tree->postorder_traversal }
Function: Return list of nodes in postorder
Returns : reference to array of Bio::Tree::Node
Args    : none

For example, the postorder traversal of the tree (((A,B)C,D),(E,F,G)); is a reference to an array of nodes with internal_id 0 through 9, because the Newick standard representation for phylogenetic trees is based on a postorder traversal.

        +---A                    +---0
        |                        |
+---+---C                +---4---2
|   |   |                |   |   |
|   |   +---B            |   |   +---1
|   |                    |   |
+   +-------D            9   +-------3
|                        |
|     +-----E            |     +-----5
|     |                  |     |
+-----+-----F            +-----8-----6
      |                        |
      +-----G                  +-----7

cluster_representation

Title   : cluster_representation
Usage   : my %cluster = %{ $tree->cluster_representation }
Function: Compute the cluster representation of a tree
Returns : reference to hash of array of string indexed by
          Bio::Tree::Node
Args    : none

For example, the cluster representation of the tree (((A,B)C,D),(E,F,G)); is a reference to a hash associating an array of string (descendent labels) to each node, as follows:

0 --> [A]
1 --> [B]
2 --> [A,B,C]
3 --> [D]
4 --> [A,B,C,D]
5 --> [E]
6 --> [F]
7 --> [G]
8 --> [E,F,G]
9 --> [A,B,C,D,E,F,G]

common_labels

Title   : common_labels
Usage   : my $labels = $tree1->common_labels($tree2);
Function: Return set of common node labels
Returns : Set::Scalar
Args    : Bio::Tree::Tree

For example, the common labels of the tree (((A,B)C,D),(E,F,G)); and the tree ((A,B)H,E,(J,(K)G)I); are: [A,B,E,G].

        +---A                 +---A
        |                     |
+---+---C             +-------H
|   |   |             |       |
|   |   +---B         |       +---B
|   |                 |
+   +-------D         +-----------E
|                     |
|     +-----E         |   +-------J
|     |               |   |
+-----+-----F         +---I
      |                   |
      +-----G             +---G---K

topological_restriction

Title   : topological_restriction
Usage   : $tree->topological_restriction($labels)
Function: Compute the topological restriction of a tree to a subset
          of node labels
Returns : Bio::Tree::Tree
Args    : Set::Scalar

For example, the topological restrictions of each of the trees (((A,B)C,D),(E,F,G)); and ((A,B)H,E,(J,(K)G)I); to the labels [A,B,E,G] are as follows:

        +---A             +---A
        |                 |
+---+---+             +---+
|       |             |   |
|       +---B         |   +---B
+                     |
|       +---E         +-------E
|       |             |
+-------+             +---+---G
        |
        +---G

is_compatible

Title   : is_compatible
Usage   : $tree1->is_compatible($tree2)
Function: Test compatibility of two trees
Returns : boolean
Args    : Bio::Tree::Tree

For example, the topological restrictions of the trees (((A,B)C,D),(E,F,G)); and ((A,B)H,E,(J,(K)G)I); to their common labels, [A,B,E,G], are compatible. The respective cluster representations are as follows:

[A]                  [A]
[B]                  [B]
[E]                  [E]
[G]                  [G]
[A,B]                [A,B]
[E,G]                [A,B,E,G]
[A,B,E,G]

As a second example, the trees (A,B); and ((B)A); are incompatible. Their respective cluster representations are as follows:

[A]                  [B]
[B]                  [A,B]
[A,B]

The reason is, the smallest cluster containing label A is [A] in the first tree but [A,B] in the second tree.

+---A         A---B
|
+
|
+---B

As a second example, the trees (((B,A),C),D); and ((A,(D,B)),C); are also incompatible. Their respective cluster representations are as follows:

[A]                  [A]
[B]                  [B]
[C]                  [C]
[D]                  [D]
[A,B]                [B,D]
[A,B,C]              [A,B,D]
[A,B,C,D]            [A,B,C,D]

The reason is, cluster [A,B] properly intersects cluster [B,D]. There are further incompatibilities between these trees: [A,B,C] properly intersects both [B,D] and [A,B,D].

        +---B             +-------A
        |                 |
    +---+             +---+   +---D
    |   |             |   |   |
+---+   +---A         |   +---+
|   |                 +       |
+   +-------C         |       +---B
|                     |
+-----------D         +-----------C