A new 12-Ricci type formula on the spinor bundle and applications

Abstract

Consider a Riemannian spin manifold (Mn, g) (n≥ 3) endowed with a non-trivial 3-form T∈3T*M, such that ∇cT=0, where ∇c:=∇g+12T is the metric connection with skew-torsion T. In this note we introduce a generalized 12-Ricci type formula for the spinorial action of the Ricci endomorphism Rics(X), induced by the one-parameter family of metric connections ∇s:=∇g+2sT. This new identity extends a result described by Th. Friedrich and E. C. Kim, about the action of the Riemannian Ricci endomorphism on spinor fields, and allows us to present a series of applications. For example, we describe a new alternative proof of the generalized Schr\"odinger-Lichnerowicz formula related to the square of the Dirac operator Ds, induced by ∇s, under the condition ∇cT=0. In the same case, we provide integrability conditions for ∇s-parallel spinors, ∇c-parallel spinors and twistor spinors with torsion. We illustrate our conclusions for some non-integrable structures satisfying our assumptions, e.g. Sasakian manifolds, nearly K\"ahler manifolds and nearly parallel G2-manifolds, in dimensions 5, 6 and 7, respectively.