Invariants for isomorphism classes in the category

Abstract

The category is a category of certain commutative graded algebras over a field. It was introduced in Lobos2 as a generalization of algebras generated by Jucys-Murphy elements in the many End algebras of the diagrammatic Soergel category of Elias and Williamson. In the first part of this article we define certain Invariants for the isomorphism classes in , following in the same spirit of Lobos3, where a series of Isomorphism criteria were found. At the end, we use our invariants to provide a new lower bound for the number of isomorphism classes, improving a similar result obtained in Lobos3.