Soap bubbles and isoperimetric regions in the product of a closed manifold with Euclidean space

Abstract

For any closed Riemannian manifold X we prove that large isoperimetric regions in X× Rn are of the form X×(Euclidean ball). We prove that if X has non-negative Ricci curvature then the only soap bubbles enclosing a large volume are the products X×(Euclidean sphere). We give an example of a surface X, with Gaussian curvature negative somewhere, such that the product X× R contains stable soap bubbles of arbitrarily large enclosed volume which do not even project surjectively onto the X factor.