On linear preservers of permanental rank

Abstract

Let Matn(F) denote the set of square n× n matrices over a field F of characteristic different from two. The permanental rank prk\,(A) of a matrix A ∈ Matn(F) is the size of the maximal square submatrix in A with nonzero permanent. By k and ≤ k we denote the subsets of matrices A ∈ Matn(F) with prk\,(A) = k and prk\,(A) ≤ k, respectively. In this paper for each 1 ≤ k ≤ n-1 we obtain a complete characterization of linear maps T: Matn(F) Matn(F) satisfying T(≤ k) = ≤ k or bijective linear maps satisfying T(≤ k) ⊂eq ≤ k. Moreover, we show that if F is an infinite field, then k is Zariski dense in ≤ k and apply this to describe such bijective linear maps satisfying T(k) ⊂eq k.