Invariant classes for families of complexes

Abstract

We consider families of chain-cochain infinite complexes C of spaces with elements depending on a number of parameters, and endowed with a converging associative multiple product. The existence of left/right local/non-local square-vanishing ideals is assumed for subspaces of C-spaces. We show that a set of differential and orthogonality relations together with coherence conditions on indices of a chain-cochain complex C elements generates families of graded differential algebras. With the appropriate orthogonality conditions on completions of C elements in the multiple product, we define the equivalence classes of cohomology invariants.

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