Doubly stochastic matrices and Schur-Weyl duality for partition algebras

Abstract

We prove that the permutations of \1,…, n\ having an increasing (resp., decreasing) subsequence of length n-r index a subset of the set of all rth Kronecker powers of n × n permutation matrices which is a basis for the linear span of that set. Thanks to a known Schur--Weyl duality, this gives a new basis for the centralizer algebra of the partition algebra acting on the rth tensor power of a vector space. We give some related results on the set of doubly stochastic matrices in that algebra.