Elliptic complexes over C*-algebras of compact operators

Abstract

For a C*-algebra A of compact operators and a compact manifold M, we prove that the Hodge theory holds for A-elliptic complexes of pseudodifferential operators acting on smooth sections of finitely generated projective A-Hilbert bundles over M. For these C*-algebras, we get also a topological isomorphism between the cohomology groups of an A-elliptic complex and the space of harmonic elements. Consequently, the cohomology groups appear to be Banach spaces. We prove as well, that if the Hodge theory holds for a complex in the category of Hilbert A-modules and continuous adjointable Hilbert A-module homomorphisms, the complex is self-adjoint parametrix possessing.