A bijection on core partitions and a parabolic quotient of the affine symmetric group

Abstract

Let ,k be fixed positive integers. In an earlier work, the first and third authors established a bijection between -cores with first part equal to k and (-1)-cores with first part less than or equal to k. This paper gives several new interpretations of that bijection. The -cores index minimal length coset representatives for S / S where S denotes the affine symmetric group and S denotes the finite symmetric group. In this setting, the bijection has a beautiful geometric interpretation in terms of the root lattice of type A-1. We also show that the bijection has a natural description in terms of another correspondence due to Lapointe and Morse.