The Cartan-Hadamard conjecture and The Little Prince

Abstract

The generalized Cartan-Hadamard conjecture says that if is a domain with fixed volume in a complete, simply connected Riemannian n-manifold M with sectional curvature K 0, then the boundary of has the least possible boundary volume when is a round n-ball with constant curvature K=. The case n=2 and =0 is an old result of Weil. We give a unified proof of this conjecture in dimensions n=2 and n=4 when =0, and a special case of the conjecture for 0 and a version for 0. Our argument uses a new interpretation, based on optical transport, optimal transport, and linear programming, of Croke's proof for n=4 and =0. The generalization to n=4 and 0 is a new result. As Croke implicitly did, we relax the curvature condition K to a weaker candle condition Candle() or LCD().We also find counterexamples to a na\"ive version of the Cartan-Hadamard conjecture: For every 0, there is a Riemannian 3-ball with (1-)-pinched negative curvature, and with boundary volume bounded by a function of and with arbitrarily large volume.We begin with a pointwise isoperimetric problem called "the problem of the Little Prince." Its proof becomes part of the more general method.