Restriction of Global Bases and Rhoades's Theorem

Abstract

It is shown that if λ is a multiple of a fundamental weight of slk, the lower global basis of the irreducible Uq(slk)-representation Vλ with highest weight λ comprises the disjoint union of the lower global bases of the irreducible Uq(slk-1)-representations appearing in the decomposition of the restriction of Vλ to Uq(slk-1). Rhoades's description of the action of the long cycle on the dual canonical basis of Vλ is then deduced from Berenstein--Zelevinsky's description of the action of the long element. This yields a short proof of Rhoades's result on tableaux fixed under promotion which directly relates it to Stembridge's result on tableaux fixed under evacuation.