On Triples, Operads, and Generalized Homogeneous Functors
Abstract
We study the splitting of the Goodwillie towers of functors in various settings. In particular, we produce splitting criteria for functors F: MA from a pointed category with coproducts to A-modules in terms of differentials of F. Here A is a commutative S-algebra. We specialize to the case when is the category of -algebras for an operad and F is the forgetful functor, and derive milder splitting conditions in terms of the derivative of F. In addition, we describe how triples induce operads, and prove that, roughly speaking, a triple T is naturally equivalent to the product of its Goodwillie layers if and only if it is an algebra over its induced operad.
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