Pal's permanent conjecture: proof for block uniform matrices

Abstract

Consider a symmetric function C(x,y) on [0,1]×[0,1] which is twice continuously differentiable up to the boundary, and which satisfies C(x,y)=C(1-x,1-y). Let A(n) = (a(n)i,j\, :\, i,j ∈ [n]) be the matrix with entries a(n)i,j\, =\, (-C(i/n,j/n)). Soumik Pal conjectured the asymptotics perm(A(n))/n! (n Λ[C])/ D[C] as n ∞ for known functionals that arise naturally in the context of entropy regularized optimal transport. The functional Λ[C] is the known large deviation rate function, already proved rigorously by Sumit Mukherjee. It is ∫01 ∫01 (α(x)+β(y))\, dx\, dy where α(x)+β(y) is chosen such that ρ(x,y) := (-C(x,y)-α(x)-β(y)) has uniform marginals. The algebraic term D[c] is given by Peter McCullagh's formula for doubly stochastic matrices: detF(I+J-T*T), the Fredholm determinant, where I is the identity on L2([0,1]), Jf(x) ∫01 f(z)\, dz (for all x) and Tf(x) = ∫01 ρ(x,y) f(y)\, dy. We prove the conjecture for functions C that are constant on blocks, exploiting a well-known Ross Pinsky's combinatorial decomposition of permutations in blocks.