Galois Theory in Symmetric Monoidal Categories

We use relations between Galois algebras and monoidal functors to describe monoidal functors between categories of representations of finite groups. We pay special attention to two kinds of these monoidal functors: monoidal functors to vector spaces and monoidal equivalences between categories of re

We present a definition of weak |-categories based on a higher-order generalization of apparatus of operads. 1998 Academic Press ## Contents. 1. From non-symmetric to higher order operads. ## 2. Monoidal globular categories. 3. Some examples. Coherence for monoidal globular categories. Copro

We consider schemes (X, O X ) over an abelian closed symmetric monoidal category (C, ⊗, 1). Our aim is to extend a theorem of Kleiman on the relative Picard functor to schemes over (C, ⊗, 1). For this purpose, we also develop some basic theory on quasi-coherent modules on schemes (X, O X ) over C.

Given a braided tensor V-category C with conjugate (dual) objects and irreducible unit together with a full symmetric subcategory S we define a crossed product C < S. This construction yields a tensor V -category with conjugates and an irreducible unit. (A V -category is a category enriched over Vec