Filtering the linearization of the category of surjections

Abstract

A filtration of the morphisms of the k-linearization k FS of the category FS of finite sets and surjections is constructed using a natural k FIop-module structure induced by restriction, where FI is the category of finite sets and injections. In particular, this yields the `primitive' subcategory k FS0 ⊂ k FS that is of independent interest; for example, the category of k FS0-modules is closely related to the category of k FA-modules, where FA is the category of finite sets and all maps. Working over a field of characteristic zero, the subquotients of this filtration are identified as bimodules over k FB, where FB is the category of finite sets and bijections, also exhibiting and exploiting additional structure. In particular, this describes the underlying k FB-bimodule of k FS0.

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