Identification to Subclasses of Chordal Graphs

Abstract

An identification of two vertices u and v in a graph replaces them with a new vertex whose neighborhood is the union of the neighborhoods of u and v. We study the H-Identification problem, which is to decide whether a given graph G can be transformed (``identified'') to a graph in H by applying at most k vertex identifications. We determine the classical and parameterized complexity of this problem for various subclasses H of chordal graphs, obtaining an almost complete picture for two parameters: k and n-k. We also consider the Identification problem, which is to test for two given graphs G and H if G can be identified to H. We determine the parameterized complexity of this problem when H is a graph from one of our testbed classes, taking the number of simplicial vertices of H as the parameter.