Linear maps on nonnegative symmetric matrices preserving the independence number

Abstract

The independence number of a square matrix A, denoted by α(A), is the maximum order of its principal zero submatrices. Let Sn+ be the set of n× n nonnegative symmetric matrices with zero trace. Denote by Jn the n× n matrix with all entries equal to one. Given any integer n, we prove that a linear map φ: Sn+→ Sn+ satisfies α(φ(X))= α(X) for~ allX∈ Sn+ if and only if there is a permutation matrix P such that φ(X)=H(PTXP) for~ allX∈ Sn+, where H=φ(Jn-In) with all off-diagonal entries positive.