On vector parking functions and q-analogue
Abstract
In 2000, it was demonstrated that the set of x-parking functions of length n, where x=(a,b,...,b) ∈ Nn, is equivalent to the set of rooted multicolored forests on [n]=\1,...,n\. In 2020, Yue Cai and Catherine H. Yan systematically investigated the properties of rational parking functions. Subsequently, a series of Context-free grammars possessing the requisite property were introduced by William Y.C. Chen and Harold R.L. Yang in 2021. %An Abelian-type identity is derived from a comparable methodology and grammatical framework. %Leveraging a comparable methodology and grammatical framework, an Abelian-type identity is derived herein. In this paper, I discuss generalized parking functions in terms of grammars. The primary result is to obtain the q-analogue about the number of '1's in certain vector parking functions with the assistance of grammars.
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