On a spectral sequence for twisted cohomologies

Abstract

Let ((M), d) be the de Rham cochain complex for a smooth compact closed manifolds M of dimension n. For an odd-degree closed form H, there are a twisted de Rham cochain complex ((M), d+H) and its associated twisted de Rham cohomology H*(M,H). We show that there exists a spectral sequence \Ep, qr, dr\ derived from the filtration Fp((M))=i≥ pi(M) of (M), which converges to the twisted de Rham cohomology H*(M,H). We also show that the differentials in the spectral sequence can be given in terms of cup products and specific elements of Massey products as well, which generalizes a result of Atiyah and Segal. Some results about the indeterminacy of differentials are also given in this paper.