Notes concerning K\"ahler and anti-K\"ahler structures on quasi-statistical manifolds

Abstract

Let (N,g,∇ )\ be a 2n-dimensional quasi-statistical manifold that admits a pseudo-Riemannian metric g (or h) and a linear connection ∇ with torsion. This paper aims to study an almost Hermitian structure (g,L) and an almost anti-Hermitian structure (h,L) on a quasi-statistical manifold that admit an almost complex structure L. Firstly, under certain conditions, we present the integrability of the almost complex structure L. We show that when d∇ L =0 and the condition of torsion-compatibility are satisfied, (N,g,∇ , L) turns into a K\"ahler manifold. Secondly, we give necessary and sufficient conditions under which (N,h,∇ ,L) is an anti-K\"a% hler manifold, where h is an anti-Hermitian metric. Moreover, we search the necessary conditions for (N,h,∇ ,L) to be a quasi-K\"ahler-Norden manifold.