Affine RSK correspondence and crystals of level zero extremal weight modules

Abstract

We give an affine analogue of the Robison-Schensted-Knuth (RSK) correspondence, which generalizes the affine Robinson-Schensted correspondence by Chmutov-Pylyavskyy-Yudovina. The affine RSK map sends a generalized affine permutation of period (m,n) to a pair of tableaux (P,Q) of the same shape, where P belongs to a tensor product of level one perfect Kirillov-Reshetikhin crystals of type Am-1(1), and Q belongs to a crystal of extremal weight module of type An-1(1) when m,n 2. We consider two affine crystal structures of types Am-1(1) and An-1(1) on the set of generalized affine permutations, and show that the affine RSK map preserves the crystal equivalence. We also give a dual affine Robison-Schensted-Knuth correspondence.