Fr\"olicher-Nijenhuis cohomology on G2- and Spin(7)-manifolds

Abstract

In this paper we show that a parallel differential form of even degree on a Riemannian manifold allows to define a natural differential both on (M) and (M, TM), defined via the Fr\"olicher-Nijenhuis bracket. For instance, on a K\"ahler manifold, these operators are the complex differential and the Dolbeault differential, respectively. We investigate this construction when taking the differential w.r.t. the canonical parallel 4-form on a G2- and Spin(7)-manifold, respectively. We calculate the cohomology groups of (M) and give a partial description of the cohomology of (M, TM).