Hamilton-Ivey estimates for gradient Ricci solitons

Abstract

We first show that any 4-dimensional non-Ricci-flat steady gradient Ricci soliton singularity model must satisfy |Rm|≤ cR for some positive constant c. Then, we apply the Hamilton-Ivey estimate to prove a quantitative lower bound of the curvature operator for 4-dimensional steady gradient solitons with linear scalar curvatrue decay and proper potential function. The technique is also used to establish a sufficient condition for a 3-dimensional expanding gradient Ricci soliton to have positive curvature. This sufficient condition is satisfied by a large class of conical expanders. As an application, we remove the positive curvature condition in a classification result by Chodosh 14 in dimension three and show that any 3-dimensional gradient Ricci expander C2 asymptotic to (C( S2), dt2+α t2 gS2) is rotationally symmetric, where α ∈ (0,1] is a constant and gS2 is the standard metric on S2 with constant curvature 1.

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