A sub-additive inequality for the volume spectrum

Abstract

Let (M,g) be a closed Riemannian manifold and \ωp\p=1∞ be the volume spectrum of (M,g). We will show that ωk+m+1≤ ωk+ωm+W for all k,m≥ 0, where ω0=0 and W is the one-parameter Almgren-Pitts width of (M,g). We will also prove the similar inequality for the -phase-transition spectrum \c(p)\p=1∞ using the Allen-Cahn approach.