Harnack Inequality on Homogeneous Spaces

Abstract

We consider a homogeneous space X=(X,d,m) of dimension ≥1 and a local regular Dirichlet form in L2(X,m) . We prove that if a Poincar\'e inequality holds on every pseudo-ball B(x,R) of X, then an Harnack's inequality can be proved on the same ball with local characteristic constant c0 and c1

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