The method of shifted partial derivatives cannot separate the permanent from the determinant

Abstract

The method of shifted partial derivatives was used to prove a super-polynomial lower bound on the size of depth four circuits needed to compute the permanent. We show that this method alone cannot prove that the padded permanent n-m permm cannot be realized inside the GLn2-orbit closure of the determinant detn when n>2m2+2m. Our proof relies on several simple degenerations of the determinant polynomial, Macaulay's theorem that gives a lower bound on the growth of an ideal, and a lower bound estimate from Gupta et. al. regarding the shifted partial derivatives of the determinant.