Stable-Limit Non-symmetric Macdonald Functions

Abstract

We construct and study an explicit simultaneous Y-eigenbasis of Ion and Wu's standard representation of the +stable-limit double affine Hecke algebra for the limit Cherednik operators Yi. This basis arises as a generalization of Cherednik's non-symmetric Macdonald polynomials of type GL. We utilize links between +stable-limit double affine Hecke algebra theory of Ion-Wu and the double Dyck path algebra of Carlsson-Mellit that arose in their proof of the Shuffle Conjecture. As a consequence, the spectral theory for the limit Cherednik operators is understood. The symmetric functions comprise the zero weight space. We introduce one extra operator that commutes with the Yi action and dramatically refines the weight spaces to now be one-dimensional. This operator, up to a change of variables, gives an extension of Haiman's operator ' from to Pas+. Additionally, we develop another method to build this weight basis using limits of trivial idempotents.