Bollob\'as-Erdos-Tuza conjecture for graphs with no induced Ks,t

Abstract

A widely open conjecture proposed by Bollob\'as, Erdos, and Tuza in the early 1990s states that for any n-vertex graph G, if the independence number α(G) = (n), then there is a subset T ⊂eq V(G) with |T| = o(n) such that T intersects all maximum independent sets of G. In this paper, we prove that this conjecture holds for graphs that do not contain an induced Ks,t for fixed t s. Our proof leverages the probabilistic method at an appropriate juncture.

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