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· 2025 · arXiv 2411.16517

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Symmetric polynomials: DIM integrable systems versus twisted Cherednik systems

hep-th · 2026-01-27 · unverdicted · novelty 7.0

For t = q^{-m}, eigenfunctions from DIM Hamiltonians and twisted Cherednik Hamiltonians combine into identical symmetric functions that are eigenfunctions of both systems simultaneously.

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Symmetric polynomials: DIM integrable systems versus twisted Cherednik systems hep-th · 2026-01-27 · unverdicted · none · ref 12
For t = q^{-m}, eigenfunctions from DIM Hamiltonians and twisted Cherednik Hamiltonians combine into identical symmetric functions that are eigenfunctions of both systems simultaneously.

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