On Equivalences of Derived Exponential Functors
Abstract
A strong symmetric monoidal functor F (Abfree,fg,) (Mod(k)flat,) is determined by the Hopf algebra F(Z) over the ring k. We will show that the algebra structure on the left derived functor L* F(P) can be recovered from the augmented coalgebra structure on F(Z) for P∈ D>2perf(Ab). Using a similar technique we will prove that the multiplicative Dold-Puppe-Thom isomorphism H*(K(A,n);Z) L*Sym A[n] is functorial in A∈ Abfg whenever n 2. By contrast, if n<1, this is known to be false in general.
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