Straight homotopy invariants
Abstract
Let X and Y be spaces and M be an abelian group. A homotopy invariant f [X,Y] M is called straight if there exists a homomorphism F L(X,Y) M such that f([a])=F( a) for all a∈ C(X,Y). Here a X Y is the homomorphism induced by a between the abelian groups freely generated by X and Y and L(X,Y) is a certain group of `admissible' homomorphisms. We show that all straight invariants can be expressed through a `universal' straight invariant of homological nature.
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