Curvature estimates for four-dimensional complete gradient expanding Ricci solitons

Abstract

In this paper, we derive curvature estimates for 4-dimensional complete gradient expanding Ricci solitons with nonnegative Ricci curvature (outside a compact set K). More precisely, we prove that the norm of the curvature tensor Rm and its covariant derivative ∇ Rm can be bounded by the scalar curvature R by |Rm| Ca Ra and |∇ Rm| Ca Ra (on M K), for any 0 a <1 and some constant Ca >0. Moreover, if the scalar curvature has at most polynomial decay at infinity, then |Rm| C R (on M K). As an application, it follows that that if a 4-dimensional complete gradient expanding Ricci soliton (M4, g, f) has nonnegative Ricci curvature and finite asymptotic scalar curvature ratio then it has finite asymptotic curvature ratio, and C1,α asymptotic cones at infinity (0 < α < 1) according to Chen-Deruelle [20].