The mixed scalar curvature flow on a fiber bundle

Abstract

We apply conformal flows of metrics restricted to the orthogonal distribution D of a foliation to study the question: Which foliations admit a metric such that the leaves are totally geodesic and the mixed scalar curvature is positive? Our evolution operator includes the integrability tensor of D, and for the case of integrable orthogonal distribution the flow velocity is proportional to the mixed scalar curvature. We observe that the mean curvature vector H of D satisfies along the leaves the forced Burgers equation, this reduces to the linear Schr\"odinger equation, whose potential function is a certain "non-umbilicity" measure of D. On order to show convergence of the solution metrics gt as t∞, we normalize the flow, and instead of a foliation consider a fiber bundle π: M B of a Riemannian manifold (M, g0). In this case, if the "non-umbilicity" of D is smaller in a sense then the "non-integrability", then the limit mixed scalar curvature function is positive. For integrable D, we give examples with foliated surfaces and twisted products.