The quantum k-Bruhat order

Abstract

In this paper, we extend the study of the quantum k-Bruhat order initiated in the work of Benedetti, Bergeron, Colmenarejo, Saliola, and Sottile concerning the quantum Murnaghan-Nakayama rule. Specifically, identifying maximal chains in intervals of the quantum k-Bruhat order with sequences of transpositions, we investigate a naturally associated free monoid Fnq with an action on a q-extension of Sn, denoted Sn[q], which encodes the chain structure of the quantum k-Bruhat order. Aside from numerous structural results, our main contribution is an identification of a large family of equivalences satisfied by the elements of Fnq as operators on Sn[q]. In fact, we conjecture that our list of equivalences is complete. As a consequence of the quantum Monk's rule, a complete understanding of such equivalences can be used to gain information about the multiplicative structure of quantum Schubert polynomials.