A quantum algorithm for the quantum Schur-Weyl transform

Abstract

We construct an efficient quantum algorithm to compute the quantum Schur-Weyl transform for any value of the quantum parameter q ∈ [0,∞]. Our algorithm is a q-deformation of the Bacon-Chuang-Harrow algorithm, in the sense that it has the same structure and is identically equal when q=1. When q=0, our algorithm is the unitary realization of the Robinson-Schensted-Knuth (or RSK) algorithm, while when q=∞ it is the dual RSK algorithm together with phase signs. Thus, we interpret a well-motivated quantum algorithm as a generalization of a well-known classical algorithm.