On the expressive power of read-once determinants

Abstract

We introduce and study the notion of read-k projections of the determinant: a polynomial f ∈ F[x1, …, xn] is called a read-k projection of determinant if f=det(M), where entries of matrix M are either field elements or variables such that each variable appears at most k times in M. A monomial set S is said to be expressible as read-k projection of determinant if there is a read-k projection of determinant f such that the monomial set of f is equal to S. We obtain basic results relating read-k determinantal projections to the well-studied notion of determinantal complexity. We show that for sufficiently large n, the n × n permanent polynomial Permn and the elementary symmetric polynomials of degree d on n variables Snd for 2 ≤ d ≤ n-2 are not expressible as read-once projection of determinant, whereas mon(Permn) and mon(Snd) are expressible as read-once projections of determinant. We also give examples of monomial sets which are not expressible as read-once projections of determinant.