Rigidity and Flexibility of Isometric Extensions

Abstract

In this paper we consider the rigidity and flexibility of C1, θ isometric extensions and we show that the H\"older exponent θ0=12 is critical in the following sense: if u∈ C1,θ is an isometric extension of a smooth isometric embedding of a codimension one submanifold and θ> 12, then the tangential connection agrees with the Levi-Civita connection along . On the other hand, for any θ<12 we can construct C1,θ isometric extensions via convex integration which violate such property. As a byproduct we get moreover an existence theorem for C1, θ isometric embeddings, θ<12, of compact Riemannian manifolds with C1 metrics and sharper amount of codimension.