The Half-Volume Spectrum of a Manifold

Abstract

We define the half-volume spectrum \ ωp\p∈ N of a closed manifold (Mn+1,g). This is analogous to the usual volume spectrum of M, except that we restrict to p-sweepouts whose slices each enclose half the volume of M. We prove that the Weyl law continues to hold for the half-volume spectrum. We define an analogous half-volume spectrum c(p) in the phase transition setting. Moreover, for 3 n+1 7, we use the Allen-Cahn min-max theory to show that each c(p) is achieved by a constant mean curvature surface enclosing half the volume of M plus a (possibly empty) collection of minimal surfaces with even multiplicities.