Combinatorial proofs on the joint distribution of descents and inverse descents
Abstract
Let An,i,j be the number of permutations on [n] with (i-1) descents and (j-1) inverse descents.Carlitz, Roselle and Scoville in 1966 first revealed some combinatorial and arithmetic properties of An,i,j,which contain a recurrence of An,i,j.Using the idea of balls in boxes,Petersen gave a combinatorial interpretation for the generating function of An,i,j,and obtained the same recurrence of An,i,j from its generating function.Subsequently, Petersen asked whether there is a visual way to understand this recurrence.In this paper,after observing the internal structures of permutation grids,we present a combinatorial proof for the recurrence of An,i,j.Let In,k and Jn,k be the number of involutions and fixed-point free involutions on [n] with k descents,respectively.With the help of algebraic method on generating functions,Guo and Zeng derived two recurrences of In,k and J2n,k that play an essential role in the proof of their unimodal properties.Surprisingly,the constructive approach to the recurrence of An,i,j is found to fuel the combinatorial interpretations of these two recurrences of In,k and J2n,k.
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