Cohomology of minimal Sullivan algebras of non-finite type and their realizations

Abstract

We prove that the morphisms from a minimal Sullivan algebra V to APL(| V|), the algebra of polynomial differential forms on its realization, can be quasi-isomorphic if and only if the cohomology H( V) is of finite type. Importantly, V itself need not be of finite type. For example, it can be the minimal Sullivan model of the wedge sum of a circle and a sphere. This provides a negative answer to a question posed by F\'elix, Halperin, and Thomas. Furthermore, we study the spaces whose homotopy groups are reflected by their minimal Sullivan models as a generalization of Sullivan spaces, and explore which properties of Sullivan spaces can be broadened.

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