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Rook theory, normal ordering in the $q$-deformed Ore algebra and the polynomial generalization

math.CO · 2026-05-10 · unverdicted · novelty 6.0

q-deformed Ore-Stirling numbers count mixed rook-file placements on staircase boards and q-deformed Ore-Lah numbers do the same on Laguerre boards, with the approach extended to polynomial commutation relations XY - qYX = f(Y).

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Rook theory, normal ordering in the $q$-deformed Ore algebra and the polynomial generalization math.CO · 2026-05-10 · unverdicted · none · ref 21
q-deformed Ore-Stirling numbers count mixed rook-file placements on staircase boards and q-deformed Ore-Lah numbers do the same on Laguerre boards, with the approach extended to polynomial commutation relations XY - qYX = f(Y).

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