A Lower Bound on Determinantal Complexity

Abstract

The determinantal complexity of a polynomial P ∈ F[x1, …, xn] over a field F is the dimension of the smallest matrix M whose entries are affine functions in F[x1, …, xn] such that P = Det(M). We prove that the determinantal complexity of the polynomial Σi = 1n xin is at least 1.5n - 3. For every n-variate polynomial of degree d, the determinantal complexity is trivially at least d, and it is a long standing open problem to prove a lower bound which is super linear in \n,d\. Our result is the first lower bound for any explicit polynomial which is bigger by a constant factor than \n,d\, and improves upon the prior best bound of n + 1, proved by Alper, Bogart and Velasco [ABV17] for the same polynomial.