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Generating twisted Cherednik eigenfunctions

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arxiv 2602.21120 v2 pith:PWCGQISE submitted 2026-02-24 hep-th math-phmath.MPmath.QA

Generating twisted Cherednik eigenfunctions

classification hep-th math-phmath.MPmath.QA
keywords cheredniktwistedeigenfunctionshamiltoniansmathfrakactionalgebraassociated
verification ladder T0 review T1 audit T2 compute T3 formal T4 reserved
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Hamiltonians ${\cal H}^{a}_k$ of new integrable systems associated with the integer rays $(1,a)$ (commutative subalgebras) of Ding-Iohara-Miki (DIM) algebra in the $N$-body representation are closely related to commuting twisted Cherednik Hamiltonians $\mathfrak{C}_i^{(a)}$, ${\cal H}^{a}_k = \sum_{i=1}^N (\mathfrak{C}_i^{(a)})^k$. Moreover, symmetric combinations of eigenfunctions in the twisted Cherednik system were recently shown to produce the DIM Hamiltonian eigenstates. We explicitly construct these twisted Cherednik eigenfunctions recurrently by action of some (creation and permutation) operations. It resembles of a far-going generalization of Kirillov-Noumi operators, but exact relation remains to be specified.

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