Normal ordering in the (p,q)-deformed generalized Weyl algebra. II: Interpretation in terms of rook placements
Abstract
In this paper, we investigate the combinatorial structure arising from the (p, q)-deformed generalized Weyl algebra generated by variables X, Y, and Zp, satisfying the (p, q)-commutation relations XY-qYX=h YsZp, XZp=pZpX, and ZpY=pYZp, where s∈ N0. Our primary objective is to use the normal ordering process defined by these relations to develop a novel model of (p, q)-deformed rook theory. Specifically, we introduce a new framework of (p, q)-deformed s-rook numbers derived from this normal ordering process. Utilizing these combinatorial models, we provide explicit combinatorial interpretations for the associated (p, q)-generalized Stirling numbers via rook placements on staircase boards. Our results extend several classical and recent formulations in the literature to the general p≠ 1 setting.
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