# L^p-stability and positive scalar curvature rigidity of Ricci-flat ALE manifolds

**Time: **
Tue 2022-10-11 10.15 - 11.15

**Location: **
Room 3418, Lindstedtsvägen 25

**Language: **
English

**Participating: **
Klaus Kröncke, KTH

We prove stability of integrable ALE manifolds with a parallel spinor under Ricci flow, given an initial metric which is close in $L^p\cap L^{\infty}$, for any $p\in (1,n)$, where n is the dimension of the manifold. In particular, our result applies to all known examples of 4-dimensional gravitational instantons.

The result is obtained by a fixed point argument, based on novel estimates for the heat kernel of the Lichnerowicz Laplacian. It allows us to give a precise description of the convergence behaviour of the Ricci flow. Our decay rates are strong enough to prove positive scalar curvature rigidity in $L^p$, for each $p\in [1,\frac{n}{n-2})$, generalizing a result by Appleton. This is joint work with Oliver Lindblad Petersen.