p-Poincaré inequalities and cutoff Sobolev inequalities on metric measure spaces

Abstract

For p>1, we introduce the cutoff Sobolev inequality on general metric measure spaces, and prove that there exists a metric measure space endowed with a p-energy that satisfies the chain condition, the volume regular condition with respect to a doubling scaling function Φ, and that both the Poincaré inequality and the the cutoff Sobolev inequality with respect to a doubling scaling function Ψ hold if and only if 1C(Rr)pΨ(R)Ψ(r) C(Rr)p-1Φ(R)Φ(r) for any r R. In particular, given any pair of doubling functions Φ and Ψ satisfying the above inequality, we construct a metric measure space endowed with a p-energy on which all the above conditions are satisfied. As a direct corollary, we prove that there exists a metric measure space which is dh-Ahlfors regular and has p-walk dimension βp if and only if pβp dh+(p-1). Our proof builds on the Laakso-type space theory, which was recently developed by Murugan [Ann. Probab., to appear].