On the action of Bender-Knuth generators of cactus group on the set of short semi-standard Young tableaux

Abstract

In the article by Michael Chmutov, Max Glick and Pavel Pylyavskii Chmutov the action of the cactus group CN on the set of semi-standard Young tableaux filled with the numbers from 1 to N was defined. Namely, they constructed the set of generators (we rightfully call them Bender-Knuth generators) of the cactus group and a group homomorphism from CN to Berenstein-Kirillov group BKN (cf. BerensteinKirillov), which sends these generators to the Bender-Knuth involutions on the set of semi-standard Young tableaux. In HenriquesKamnitzer Andre Henriques and Joel Kamnitzer defined a natural action of cactus group CN on the tensor product of N normal crystals via commutors. By applying their result I defined the action of cactus group CN on the set of short semi-standard Young tableaux filled with the numbers 1, 2, …, N in Svyatnyy. A semi-standard Young tableau is called short if the number of cells in the first two columns with the numbers ≤slant N is less than or equal to N. The set of short semi-standard Young tableaux obviously forms a subset inside the set of semi-standard Young tableaux. The purpose of this paper is to explicitly compute the action of Bender-Knuth generators of cactus group CN on the set of short semi-standard Young tableaux defined in Svyatnyy and compare it with their action on the set of semi-standard Young tableaux defined in Chmutov.