Sharp Bounds for Sums Associated to Graphs of Matrices

Abstract

We provide a simple algorithm for finding the optimal upper bound for sums of products of matrix entries of the form Spi(N) := sumj1, ..., j2m = 1N t1j1 j2 t2j3 j4 ... tmj2m-1 j2m where some of the summation indices are constrained to be equal. The upper bound is easily obtained from a graph G associated to the constraints in the sum.