Differential operators, grammars and Young tableaux
Abstract
In algebraic combinatorics and formal calculation, context-free grammar is defined by a formal derivative based on a set of substitution rules. In this paper, we investigate this issue from three related viewpoints. Firstly, we introduce a differential operator method. As one of the applications, we deduce a new grammar for the Narayana polynomials. Secondly, we investigate the normal ordered grammars associated with the Eulerian polynomials. Thirdly, motivated by the theory of differential posets, we introduce a box sorting algorithm which leads to a bijection between the terms in the expansion of and a kind of ordered weak set partitions, where is a smooth function in the indeterminate and is the derivative with respect to . Using a map from ordered weak set partitions to standard Young tableaux, we find an expansion of in terms of standard Young tableaux. Combining this with the theory of context-free grammars, we provide a unified interpretations for the Ramanujan polynomials, Andr\'e polynomials, left peak polynomials, interior peak polynomials, Eulerian polynomials of types and , -Eulerian polynomials, second-order Eulerian polynomials, and Narayana polynomials of types and in terms of standard Young tableaux. Along the same lines, we present an expansion of the powers of in terms of standard Young tableaux, where is a positive integer. In particular, we provide four interpretations for the second-order Eulerian polynomials. All of the above apply to the theory of formal differential operator rings.
Keywords
Cite
@article{arxiv.2312.02830,
title = {Differential operators, grammars and Young tableaux},
author = {Shi-Mei Ma and Jean Yeh and Yeong-Nan Yeh},
journal= {arXiv preprint arXiv:2312.02830},
year = {2023}
}
Comments
38 pages