The μ-permanent revisited
Abstract
Let A=(aij) be an n-by-n matrix. For any real number μ, we define the polynomial Pμ(A)=Σσ∈ Sn a1σ(1)·s anσ(n)\,μ(σ)\; , as the μ-permanent of A, where (σ) is the number of inversions of the permutation σ in the symmetric group Sn. In this note, we review several less known results of the μ-permanent, recalling some of its interesting properties. Some determinantal conjectures are considered and extended to that polynomial. A correction to a previous note is presented as well.
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