Characterizations of undirected 2-quasi best match graphs
Abstract
Bipartite best match graphs (BMG) and their generalizations arise in mathematical phylogenetics as combinatorial models describing evolutionary relationships among related genes in a pair of species. In this work, we characterize the class of undirected 2-quasi-BMGs (un2qBMGs), which form a proper subclass of the P6-free chordal bipartite graphs. We show that un2qBMGs are exactly the class of bipartite graphs free of P6, C6, and the eight-vertex Sunlet4 graph. Equivalently, a bipartite graph G is un2qBMG if and only if every connected induced subgraph contains a ``heart-vertex'' which is adjacent to all the vertices of the opposite color. We further provide a O(|V(G)|3) algorithm for the recognition of un2qBMGs that, in the affirmative case, constructs a labeled rooted tree that ``explains'' G. Finally, since un2qBMGs coincide with the (P6,C6)-free bi-cographs, they can also be recognized in linear time.
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