Reynolds Operator on functors
Abstract
Let G= Spec A be an affine R-monoid scheme. We prove that the category of dual functors (over the category of commutative R-algebras) of G-modules is equivalent to the category of dual functors of A*-modules. We prove that G is invariant exact if and only if A*= R × B* as R-algebras and the first projection A* R is the unit of A. If M is a dual functor of G-modules and wG := (1,0) ∈ R × B* = A*, we prove that MG = wG · M and F = wG · M (1-wG) · M; hence, the Reynolds operator can defined on M.
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