Kählerian structures on generalized doubly \(\mathcal{D}\)-homothetic bi-warping (Q1709837)

In this paper the authors introduce the notion of generalized doubly \(\mathcal{D}\)-homothetic bi-warping. Then, they use this to obtain a characterization of certain geometric structures. More explicitly, let \(M',M\) be almost contact metric manifolds and let \((\tilde{g},\tilde{J})\) be a certain Hermitian structure on \(M'\times M.\) Assume further that \(f\) and \(F\) are positive functions on \(M'\) and \(M\) respectively. The authors obtain necessary and sufficient conditions for \(M'\times M\) to be Kähler by studying several cases involving \(f\) and \(F\) as well as individual geometric properties of \(M'\) and \(M\).