Title: Curvature formulas and curvature strict positivity of direct image bundles

Abstract: In this paper, we consider the curvature strict positivity of direct image bundles (vector bundles) associated to a strictly pseudoconvex family of bounded domains. The main result is that the curvature of the direct image bundle (vector bundles) associated to a strictly pseudoconvex family of bounded domains is strictly positive in the sense of Nakano even if the curvature of the original vector bundle is just Nakano positive. Based on our (I and my coauthors) previous results, this result further demonstrates that strictly pseudoconvex domains and pseudoconvex domains have very different geometric properties. To consider the curvature strict positivity, we will first construct the curvature formulas for vector bundles, then the curvature strict positivity of a strictly pseudoconvex family of bounded domains will be a simple consequence of it. As applications to convex analysis, we get a corresponding version of Pr\'ekopa's Theorem, i.e., we get the strict positivity of a strictly convex family of bounded domains.