Let T be an unrooted binary tree with n distinctly labelled leaves. Deriving its name from the field of phylogenetics, a convex character on T is simply a partition of the leaves such that the minimal spanning subtrees induced by the blocks of the partition are mutually disjoint. In earlier work Kelk and Stamoulis (Advances in Applied Mathematics 84 (2017), pp. 34-46) defined g(k)(T) as the number of convex characters where each block has at least k leaves. Exact expressions were given for g(1) and g(2), where the topology of T turns out to be irrelevant, and it was noted that for k >= 3 topological neutrality no longer holds. In this article, for every k >= 3 we describe tree topologies achieving the maximum and minimum values of g(k...
Previous work has shown the perhaps surprising result that, for any binary phylogenetic tree T, ther...
We investigate the class of the edge-shelling convex geometries of trees. The edge-shelling convex g...
Semple and Steel (2002) showed that if T is a phylogenetic X-tree and C is a collection of r-state c...
Let T be an unrooted binary tree with n distinctly labelled leaves. Deriving its name from the field...
Given two phylogenetic trees on the same set of taxa X, the maximum parsimony distance d(MP) is defi...
Phylogenetic trees are used to model evolution: leaves are labelled to represent contemporary specie...
It was recently shown that just five characters (functions on a finite set X) suffice to convexly de...
A coloring of a graph is convex if it induces a partition of the vertices into connected sub-graphs....
We introduce a strong extended formulation of the convex recoloring problem on a tree, which has an ...
AbstractRecently, by studying Z5-edge colorings of bifurcating phylogenetic trees, Semple and Steel ...
Semple and Steel (2002) showed that if T is a phylogenetic X-tree and C is a collection of r-state c...
International audienceThe Huffman tree is a well known concept in data compression discovered by Dav...
Dress A, STEEL M. Convex tree realizations of partitions. Applied Mathematics Letters. 1992;5(3):3-6...
Previous work has shown the perhaps surprising result that, for any binary phylogenetic tree T, ther...
Previous work has shown the perhaps surprising result that, for any binary phylogenetic tree T, ther...
We investigate the class of the edge-shelling convex geometries of trees. The edge-shelling convex g...
Semple and Steel (2002) showed that if T is a phylogenetic X-tree and C is a collection of r-state c...
Let T be an unrooted binary tree with n distinctly labelled leaves. Deriving its name from the field...
Given two phylogenetic trees on the same set of taxa X, the maximum parsimony distance d(MP) is defi...
Phylogenetic trees are used to model evolution: leaves are labelled to represent contemporary specie...
It was recently shown that just five characters (functions on a finite set X) suffice to convexly de...
A coloring of a graph is convex if it induces a partition of the vertices into connected sub-graphs....
We introduce a strong extended formulation of the convex recoloring problem on a tree, which has an ...
AbstractRecently, by studying Z5-edge colorings of bifurcating phylogenetic trees, Semple and Steel ...
Semple and Steel (2002) showed that if T is a phylogenetic X-tree and C is a collection of r-state c...
International audienceThe Huffman tree is a well known concept in data compression discovered by Dav...
Dress A, STEEL M. Convex tree realizations of partitions. Applied Mathematics Letters. 1992;5(3):3-6...
Previous work has shown the perhaps surprising result that, for any binary phylogenetic tree T, ther...
Previous work has shown the perhaps surprising result that, for any binary phylogenetic tree T, ther...
We investigate the class of the edge-shelling convex geometries of trees. The edge-shelling convex g...
Semple and Steel (2002) showed that if T is a phylogenetic X-tree and C is a collection of r-state c...