On the proper interval completion problem within some chordal subclasses
Abstract
Given a property (graph class) , a graph G, and an integer k, the -completion problem consists in deciding whether we can turn G into a graph with the property by adding at most k edges to G. The -completion problem is known to be NP-hard for general graphs when is the property of being a proper interval graph (PIG). In this work, we study the PIG-completion problem %when is the class of proper interval graphs (PIG) within different subclasses of chordal graphs. We show that the problem remains NP-complete even when restricted to split graphs. We then turn our attention to positive results and present polynomial time algorithms to solve the PIG-completion problem when the input is restricted to caterpillar and threshold graphs. We also present an efficient algorithm for the minimum co-bipartite-completion for quasi-threshold graphs, which provides a lower bound for the PIG-completion problem within this graph class.
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