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Isoperimetric estimates in the product of small and large volume manifolds

Juan Miguel Ruiz, Areli Vázquez Juárez

Abstract

Let $(M^m,g)$, $(N^n,h)$ be closed Riemannian manifolds, $m,n\geq 2$, with concave isoperimetric profiles and volumes $V_M$, $V_N$ respectively. We consider a one parameter family of product manifolds of the same volume, $(X,G_λ)=(M^m\times N^n,λ^{2n}g+ λ^{-2m}h)$, $λ>0$, and estimate a lower bound for their isoperimetric profile for big $λ$. In particular, we show that for $α\in (\frac{3}{4},1)$ and $v_0 \in (0, V_MV_N)$, there is some $λ_{0}>0$, such that for $λ>λ_0$, we can bound the isoperimetric profile of $(X,G_λ)$: $$ α^{4} f_{M,λ}(v_0) \leq I_{(X,G_λ)}(v_0)\leq f_{M,λ}(v_0)$$ where $f_{M,λ}(v)= λ^{-n} V_N I_{(M,g)}(\frac{v}{V_N})$ and $ I_{(M,g)}$ is the isoperimetric profile of $(M,g)$. Moreover if $(M,g)=(S^m,g_0)$, the $m-$sphere with the round metric, in this setting, we show that some regions of the type ${ D^λ(r)\times N_λ }$, are actual isoperimetric regions in $ (S^m\times N^n,λ^{2n}g_0+ λ^{-2m}h)$ when $λ$ is big enough; being $D^λ(r)$ a disk on $(S^m,λ^{2n}g_0)$ and $N_λ=(N, λ^{-2m}h)$.

Isoperimetric estimates in the product of small and large volume manifolds

Abstract

Let , be closed Riemannian manifolds, , with concave isoperimetric profiles and volumes , respectively. We consider a one parameter family of product manifolds of the same volume, , , and estimate a lower bound for their isoperimetric profile for big . In particular, we show that for and , there is some , such that for , we can bound the isoperimetric profile of : where and is the isoperimetric profile of . Moreover if , the sphere with the round metric, in this setting, we show that some regions of the type , are actual isoperimetric regions in when is big enough; being a disk on and .
Paper Structure (9 sections, 14 theorems, 52 equations)

This paper contains 9 sections, 14 theorems, 52 equations.

Key Result

Theorem 1.1

Let $(M^m,g)$, $(N^n,h)$ be compact Riemannian manifolds without boundary, $m,n\geq 2$, concave isoperimetric profiles and volumes $V_M$, $V_N$ respectively. Let $(X,G_{\lambda})=(M^m\times N^n,\lambda^{2n}g+ \lambda^{-2m}h)$. Let $\alpha \in (\frac{3}{4},1)$. Then, for $v_0 \in (0, V_MV_N)$, there where $f_{M,\lambda}(v)= \lambda^{-n} V_N I_{(M,g)}(\frac{v}{V_N})$.

Theorems & Definitions (22)

  • Theorem 1.1
  • Theorem 1.2
  • Theorem 2.1
  • Lemma 2.2
  • Lemma 2.3
  • Lemma 2.4
  • Lemma 2.5
  • Lemma 4.1
  • proof
  • Remark 4.2
  • ...and 12 more