On the Betti numbers of a loop space

Abstract

Let A be a special homotopy G-algebra over a commutative unital ring such that both H(A) and ToriA(,) are finitely generated -modules for all i, and let τi(A) be the cardinality of a minimal generating set for the -module ToriA(,). Then the set τi(A) is unbounded if and only if H(A) has two or more algebra generators. When A=C(X;) is the simplicial cochain complex of a simply connected finite CW-complex X, there is a similar statement for the "Betti numbers" of the loop space X. This unifies existing proofs over a field of zero or positive characteristic.