On the Chern-Ricci form of a twisted almost K\"ahler structure

Abstract

Let (M,g,J,ω) be an almost K\"ahler manifold. For any smooth function f on M, one can associate an automorphism ∈ Aut(TM) for which the K\"ahler form is invariant. Using , one can ``twist" the metric g and almost complex structure J to obtain a new almost K\"ahler structure (g,J,ω) on M. Let D denote the Chern connection of (g,J,ω) and let K-1 denote the anti-canonical bundle of (TM,J). In the current paper, we give an explicit formula for the local connection 1-form α associated to the pair (K-1,D). The Chern-Ricci form of (g,J,ω) is then D=-dα. We note that under certain conditions the aforementioned formula assumes a simpler form when applied to the calculation of α. We illustrate this with some examples.