Harmonic complex structures and special Hermitian metrics on products of Sasakian manifolds

Abstract

It is well known that the product of two Sasakian manifolds carries a 2-parameter family of Hermitian structures (Ja,b,ga,b). We show in this article that the complex structure Ja,b is harmonic with respect to ga,b, i.e. it is a critical point of the Dirichlet energy functional. Furthermore, we also determine when these Hermitian structures are locally conformally K\"ahler, balanced, strong K\"ahler with torsion, Gauduchon or k-Gauduchon (k≥ 2). Finally, we study the Bismut connection associated to (Ja,b, ga,b) and we provide formulas for the Bismut-Ricci tensor RicB and the Bismut-Ricci form B. We show that these tensors vanish if and only if each Sasakian factor is η-Einstein with appropriate constants and we also exhibit some examples fulfilling these conditions, thus providing new examples of Calabi-Yau with torsion manifolds.