A Loewner-Nirenberg phenomena for Ricci flow on compact manifolds with boundary

Abstract

In this paper, we show that starting from a geodesic ball Br0(0) in Hn, for n≥3, with prescribed non-decreasing rotationally symmetric mean curvature and the fixed conformal class [gSn-1] on the boundary, the solution g(t) to the normalized Ricci flow (1.2) which is continuous up to the boundary, exists for all t>0 and converges locally uniformly in Br0(0) to a complete hyperbolic metric as t∞(see Theorem 1.2 for details). Moreover, the sectional curvature of g(t) maintains less than -1 for t>0. For dimension 2, to achieve such a convergence result, we need the additional assumption that the mean curvature on the boundary increases in a certain speed to infinity as t∞.