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Prekosmic Grothendieck/Galois Categories

Jaehyeok Lee

Abstract

We establish a generalized version of the duality between groups and the categories of their representations on sets. Given an abstract symmetric monoidal category $K$ called Galois prekosmos, we define pre-Galois objects in $K$ and study the categories of their representations internal to $K$. The motivating example of $K$ is the cartesian monoidal category $\textit{Set}$ of sets, and pre-Galois objects in $\textit{Set}$ are groups. We present an axiomatic definition of pre-Galois $K$-categories, which is a complete abstract characterization of the categories of representations of pre-Galois objects in $K$. The category of covering spaces over a well-connected topological space is a prototype of a pre-Galois $\textit{Set}$-category. We establish a perfect correspondence between pre-Galois objects in $K$ and pre-Galois $K$-categories pointed with pre-fiber functors. We also establish a generalized version of the duality between flat affine group schemes and the categories of their linear representations. Given an abstract symmetric monoidal category $K$ called Grothendieck prekosmos, we define what are pre-Grothendieck objects in $K$ and study the categories of their representations internal to $K$. The motivating example of $K$ is the symmetric monoidal category $\textit{Vec}_k$ of vector spaces over a field $k$, and pre-Grothendieck objects in $\textit{Vec}_k$ are affine group $k$-schemes. We present an axiomatic definition of pre-Grothendieck $K$-categories, which is a complete abstract characterization of the categories of representations of pre-Grothendieck objects in $K$. The indization of a neutral Tannakian category over a field $k$ is a prototype of a pre-Grothendieck $\textit{Vec}_k$-category. We establish a perfect correspondence between pre-Grothendieck objects in $K$ and pre-Grothendieck $K$-categories pointed with pre-fiber functors.

Prekosmic Grothendieck/Galois Categories

Abstract

We establish a generalized version of the duality between groups and the categories of their representations on sets. Given an abstract symmetric monoidal category called Galois prekosmos, we define pre-Galois objects in and study the categories of their representations internal to . The motivating example of is the cartesian monoidal category of sets, and pre-Galois objects in are groups. We present an axiomatic definition of pre-Galois -categories, which is a complete abstract characterization of the categories of representations of pre-Galois objects in . The category of covering spaces over a well-connected topological space is a prototype of a pre-Galois -category. We establish a perfect correspondence between pre-Galois objects in and pre-Galois -categories pointed with pre-fiber functors. We also establish a generalized version of the duality between flat affine group schemes and the categories of their linear representations. Given an abstract symmetric monoidal category called Grothendieck prekosmos, we define what are pre-Grothendieck objects in and study the categories of their representations internal to . The motivating example of is the symmetric monoidal category of vector spaces over a field , and pre-Grothendieck objects in are affine group -schemes. We present an axiomatic definition of pre-Grothendieck -categories, which is a complete abstract characterization of the categories of representations of pre-Grothendieck objects in . The indization of a neutral Tannakian category over a field is a prototype of a pre-Grothendieck -category. We establish a perfect correspondence between pre-Grothendieck objects in and pre-Grothendieck -categories pointed with pre-fiber functors.