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Macdonald Duality and the proof of the Quantum Q-system conjecture.

Authors :
Di Francesco, Philippe
Kedem, Rinat
Source :
Selecta Mathematica, New Series. Apr2024, Vol. 30 Issue 2, p1-100. 100p.
Publication Year :
2024

Abstract

The SL (2 , Z) -symmetry of Cherednik's spherical double affine Hecke algebras in Macdonald theory includes a distinguished generator which acts as a discrete time evolution of Macdonald operators, which can also be interpreted as a torus Dehn twist in type A. We prove for all twisted and untwisted affine algebras of type ABCD that the time-evolved q-difference Macdonald operators, in the t → ∞ q-Whittaker limit, form a representation of the associated discrete integrable quantum Q-systems, which are obtained, in all but one case, via the canonical quantization of suitable cluster algebras. The proof relies strongly on the duality property of Macdonald and Koornwinder polynomials, which allows, in the q-Whittaker limit, for a unified description of the quantum Q-system variables and the conserved quantities as limits of the time-evolved Macdonald operators and the Pieri operators, respectively. The latter are identified with relativistic q-difference Toda Hamiltonians. A crucial ingredient in the proof is the use of the "Fourier transformed" picture, in which we compute time-translation operators and prove that they commute with the Pieri operators or Hamiltonians. We also discuss the universal solutions of Koornwinder-Macdonald eigenvalue and Pieri equations, for which we prove a duality relation, which simplifies the proofs further. [ABSTRACT FROM AUTHOR]

Details

Language :
English
ISSN :
10221824
Volume :
30
Issue :
2
Database :
Academic Search Index
Journal :
Selecta Mathematica, New Series
Publication Type :
Academic Journal
Accession number :
175966262
Full Text :
https://doi.org/10.1007/s00029-023-00909-z