Rotational symmetry of non negatively curved expanding gradient Ricci solitons

Abstract

Let (Mn,g,∇ f), n≥ 3, be an expanding gradient Ricci soliton with nonnegative sectional curvature whose asymptotic cone is isometric to C(Sn-1(c)) where Sn-1(c) is the standard (n-1)-sphere of curvature 1/c2, with c∈(0,1). We prove that if the convergence to the asymptotic cone is smooth, (Mn,g,∇ f) is rotationally symmetric. This is the expanding analogue of the Perelman conjecture on the Bryant soliton and this work is based on the proof by Brendle Bre-Rot-3d. This has also been proved recently by Chodosh Cho-EGS.