Cristian Lenart
Published 2014-06-02Version 1
Richard Stanley played a crucial role, through his work and his students, in the development of the relatively new area known as combinatorial representation theory. In the early stages, he has the merit to have pointed out to combinatorialists the potential that representation theory has for applications of combinatorial methods. Throughout his distinguished career, he wrote significant articles which touch upon various combinatorial aspects related to representation theory (of Lie algebras, the symmetric group, etc.). I describe some of Richard's contributions involving Lie algebras, as well as recent developments inspired by them (including some open problems), which attest the lasting impact of his work.
Universal Polynomial $\mathfrak{so}$ Weight System
Transitive factorizations of free partially commutative monoids and Lie algebras
Developments from Programming the Partition Method for a Power Series Expansion
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