A stability result using the matrix norm to bound the permanent

Abstract

We prove a stability version of a general result that bounds the permanent of a matrix in terms of its operator norm. More specifically, suppose A is an n × n matrix over C (resp. R), and let P denote the set of n × n matrices over C (resp. R) that can be written as a permutation matrix times a unitary diagonal matrix. Then it is known that the permanent of A satisfies |perm(A)| ≤ A 2 n with equality iff A/ A 2 ∈ P (where A 2 is the operator 2-norm of A). We show a stability version of this result asserting that unless A is very close (in a particular sense) to one of these extremal matrices, its permanent is exponentially smaller (as a function of n) than A 2 n. In particular, for any fixed α, β > 0, we show that |perm(A)| is exponentially smaller than A 2 n unless all but at most α n rows contain entries of modulus at least A 2 (1 - β).