Rook numbers and the normal ordering problem
Abstract
For an element w in the Weyl algebra generated by D and U with relation DU=UD+1, the normally ordered form is w=Σ ci,jUiDj. We demonstrate that the normal order coefficients ci,j of a word w are rook numbers on a Ferrers board. We use this interpretation to give a new proof of the rook factorization theorem, which we use to provide an explicit formula for the coefficients ci,j. We calculate the Weyl binomial coefficients: normal order coefficients of the element (D+U)n in the Weyl algebra. We extend all these results to the q-analogue of the Weyl algebra. We discuss further generalizations using i-rook numbers.
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