Infinitesimal change of stable basis
Abstract
The purpose of this note is to study the Maulik-Okounkov K-theoretic stable basis for the Hilbert scheme of points on the plane, which depends on a "slope" m ∈ R. When m = ab is rational, we study the change of stable matrix from slope m- to m+ for small >0, and conjecture that it is related to the Leclerc-Thibon conjugation in the q-Fock space for Uqglb. This is part of a wide framework of connections involving derived categories of quantized Hilbert schemes, modules for rational Cherednik algebras and Hecke algebras at roots of unity.
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