Isoperimetric estimates in the product of small and large volume manifolds

Abstract

Let (Mm,g), (Nn,h) be closed Riemannian manifolds, m,n≥ 2, with concave isoperimetric profiles and volumes VM, VN respectively. We consider a one parameter family of product manifolds of the same volume, (X,Gλ)=(Mm× Nn,λ2ng+ λ-2mh), λ>0, and estimate a lower bound for their isoperimetric profile for big λ. In particular, we show that for α ∈ (34,1) and v0 ∈ (0, VMVN), there is some λ0>0, such that for λ>λ0, we can bound the isoperimetric profile of (X,Gλ): α4 fM,λ(v0) ≤ I(X,Gλ)(v0)≤ fM,λ(v0) where fM,λ(v)= λ-n VN I(M,g)(vVN) and I(M,g) is the isoperimetric profile of (M,g). Moreover if (M,g)=(Sm,g0), the m-sphere with the round metric, in this setting, we show that some regions of the type Dλ(r)× Nλ , are actual isoperimetric regions in (Sm× Nn,λ2ng0+ λ-2mh) when λ is big enough; being Dλ(r) a disk on (Sm,λ2ng0) and Nλ=(N, λ-2mh).