On Induced Subgraph of Cartesian Product of Paths

Abstract

Chung, F\"uredi, Graham, and Seymour (JCTA, 1988) constructed an induced subgraph of the hypercube Qn with α(Qn)+1 vertices and with maximum degree smaller than n . Subsequently, Huang (Annals of Mathematics, 2019) proved the Sensitivity Conjecture by demonstrating that the maximum degree of such an induced subgraph of hypercube Qn is at least n , and posed the question: Given a graph G, let f(G) be the minimum of the maximum degree of an induced subgraph of G on α(G)+1 vertices, what can we say about f(G)? In this paper, we investigate this question for Cartesian product of paths Pm, denoted by Pmk. We determine the exact values of f(Pmk) when m=2n+1 by showing that f(P2n+1k)=1 for n≥ 2 and f(P3k)=2, and give a nontrivial lower bound of f(Pmk) when m=2n by showing that f(P2nk)≥ βnk. In particular, when n=1, we have f(Qk)=f(P2k) k, which is Huang's result. The lower bounds of f(P3k) and f(P2nk) are given by using the spectral method provided by Huang.