Poisson Doubly Warped Product Manifolds

This article generalizes some geometric structures on warped product manifolds equipped with a Poisson structure to doubly warped products of pseudo-Riemannian manifolds equipped with a doubly warped Poisson structure. First, we introduce the notion of Poisson doubly warped product manifold ( f B × b F , Π = μ v Π B h + ν h Π F v , g ) and express the Levi-Civita contravariant connection, curvature and metacurvature of ( f B × b F , Π , g ) in terms of Levi-Civita connections, curvatures and metacurvatures of components ( B , Π B , g B ) and ( F , Π F , g F ) . We also study compatibility conditions related to the Poisson structure Π and the contravariant metric g on f B × b F , so that the compatibility conditions on ( B , Π B , g B ) and ( F , Π F , g F ) remain consistent in the Poisson doubly warped product manifold ( f B × b F , Π , g ) .