#P-hardness proofs of matrix immanants evaluated on restricted matrices

Abstract

We establish the \#P-hardness of computing a broad class of immanants, even when restricted to specific categories of matrices. Concretely, we prove that computing λ-immanants of 0-1 matrices is \#P-hard whenever the partition~λ contains a sufficiently large domino-tileable region, subject to certain technical conditions. We also give hardness proofs for some λ-immanants of weighted adjacency matrices of planar directed graphs, such that the shape λ = (1 + λd) has size n such that |λd| = n for some 0 < < 12, and such that for some w, the shape λd/(w) is tileable with 1 × 2 dominos.