Induced subgraphs of product graphs and a generalization of Huang's theorem

Abstract

Recently, Huang showed that every (2n-1+1)-vertex induced subgraph of the n-dimensional hypercube has maximum degree at least n in [Annals of Mathematics, 190 (2019), 949--955]. In this paper, we discuss the induced subgraphs of Cartesian product graphs and semi-strong product graphs to generalize Huang's result. Let 1 be a connected signed bipartite graph of order n and 2 be a connected signed graph of order m. By defining two kinds of signed product of 1 and 2, denoted by 12 and 1 2, we show that if 1 and 2 have exactly two distinct adjacency eigenvalues θ1 and θ2 respectively, then every (12mn+1)-vertex induced subgraph of 12 (resp. 1 2) has maximum degree at least θ12+θ22 (resp. (θ12+1)θ22). Moreover, we discuss the eigenvalues of 1 2 and 1 2 and obtain a sufficient and necessary condition such that the spectrum of 12 and 12 are symmetric, from which we obtain more general results on maximum degree of the induced subgraphs.