Characterization and linear-time recognition of balanced distance-hereditary graphs

Abstract

A graph is balanced if its clique-matrix contains no square submatrix of odd order with exactly two 1's in each row and in each column. Although it is known that a graph is balanced if and only if it contains no induced extended odd sun, a characterization of balanced graphs by minimal forbidden induced subgraphs is still unknown. In this work, we prove that, within the class of distance-hereditary graphs, balanced graphs are exactly the hereditary clique-Helly graphs. Equivalently, they are characterized by a single forbidden induced subgraph, namely 3K2. From this result, we derive an explicit linear-time algorithm that decides balancedness within the class of distance-hereditary graphs and returns an induced 3K2 when the input graph is not balanced.

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