Optimal isoperimetric inequalities for surfaces in any codimension in Cartan-Hadamard manifolds

Abstract

Let (Mn,g) be simply connected, complete, with non-positive sectional curvatures, and a 2-dimensional closed integral current (or flat chain mod 2) with compact support in M. Let S be an area minimising integral 3-current (resp. flat chain mod 2) such that ∂ S = . We use a weak mean curvature flow, obtained via elliptic regularisation, starting from , to show that S satisfies the optimal Euclidean isoperimetric inequality: 6 π\, M[S] ≤ (M[])3/2 . We also obtain an optimal estimate in case the sectional curvatures of M are bounded from above by - < 0 and characterise the case of equality. The proof follows from an almost monotonicity of a suitable isoperimetric difference along the approximating flows in one dimension higher and an optimal estimate for the Willmore energy of a 2-dimensional integral varifold with first variation summable in L2.