The monoidal structure of the category of partial representations of finite groups

Abstract

In this work, we analyze the structure of the category of partial representations of a finite group G as a multifusion category, providing an alternative way to describe simple objects and their tensor products. We describe the interconnection between the category of partial representations of a finite group and the category of global representations of its subgroups (the Christmas Tree's Theorem). Also, for a finite abelian group G, we prove that the category of partial representations of any of its subgroups can be embedded into the category of partial representations of G (the Matryoshka's Theorem).