Complete gradient expanding Ricci solitons with finite asymptotic scalar curvature ratio
Abstract
Let (Mn, g, f), n≥ 5, be a complete gradient expanding Ricci soliton with nonnegative Ricci curvature Rc≥ 0. In this paper, we show that if the asymptotic scalar curvature ratio of (Mn, g, f) is finite (i.e., r ∞ R r2< ∞ ), then the Riemann curvature tensor must have at least sub-quadratic decay, namely, r ∞ |Rm| \ \! rα< ∞ for any 0<α<2.
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