Revisiting q-Derangement Numbers via Decorated Permutations

Abstract

This note aims to provide a direct combinatorial proof of the Gessel--Reutenauer--Wachs formula for q-derangement numbers in the setting of decorated permutations, without using the q-binomial inversion formula. Decorated permutations, introduced by Postnikov in his study of the totally nonnegative Grassmannian, provide a natural framework for Chen's signed fixed-point model. Our proof is based on a major-index generating function for decorated permutations with a fixed number of signed fixed points, together with a sign-reversing and descent-set-preserving involution, thereby answering a question raised by Chen. This involution was discovered through human--AI collaboration.

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