Poincaré-Einstein 4-manifolds with cusps

Abstract

In this paper, we construct Poincaré-Einstein 4-manifolds with various kinds of cusps. In particular, we construct: (1) Infinite families of Einstein metrics on (0,∞)× N, where N T2 is a principal S1-bundle over T2, with one Poincaré-Einstein end and one end asymptotic to a real or complex hyperbolic cusp. (2) Infinite families of Einstein metrics on (0,∞)× P, where P Σg is a principal S1-bundle over a closed Riemann surface Σg of genus g≥ 2, with one Poincaré-Einstein end and one end asymptotic to a bundle of two-dimensional hyperbolic cusps over hyperbolic Σg. Universal covers of (1) and (2) provide new complete negative Einstein metrics on R4. These Einstein metrics also exhibit interesting degeneration phenomena. With this construction, we give a negative answer to a question of Anderson concerning cusp formation for Poincaré-Einstein 4-manifolds.