Remarks on the α--permanent

Abstract

We recall Vere-Jones's definition of the α--permanent and describe the connection between the (1/2)--permanent and the hafnian. We establish expansion formulae for the α--permanent in terms of partitions of the index set, and we use these to prove Lieb-type inequalities for the α--permanent of a positive semi-definite Hermitian n× n matrix and the α/2--permanent of a positive semi-definite real symmetric n× n matrix if α is a nonnegative integer or α n-1. We are unable to settle Shirai's nonnegativity conjecture for α--permanents when α 1, but we verify it up to the 5× 5 case, in addition to recovering and refining some of Shirai's partial results by purely combinatorial proofs.