English

Reynolds Operator on functors

Algebraic Geometry 2009-08-31 v5 Commutative Algebra

Abstract

Let G=SpecAG= {\rm Spec} A be an affine RR-monoid scheme. We prove that the category of dual functors (over the category of commutative RR-algebras) of GG-modules is equivalent to the category of dual functors of A{\mathcal A}^*-modules. We prove that GG is invariant exact if and only if A=R×BA^*= R \times B^* as RR-algebras and the first projection ARA^* \to R is the unit of AA. If M\mathbb M is a dual functor of GG-modules and wG:=(1,0)R×B=Aw_G := (1,0) \in R \times B^* = A^*, we prove that MG=wGM\mathbb M^G = w_G \cdot \mathbb M and F=wGM(1wG)M\mathbb F = w_G \cdot \mathbb M \oplus (1-w_G) \cdot \mathbb M; hence, the Reynolds operator can defined on M\mathcal M.

Keywords

Cite

@article{arxiv.math/0611311,
  title  = {Reynolds Operator on functors},
  author = {Amelia Alvarez and Carlos Sancho and Pedro Sancho},
  journal= {arXiv preprint arXiv:math/0611311},
  year   = {2009}
}

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