arXiv:2206.13275 Abstract | arXiv Analytics

arXiv:2206.13275 [math.GR]Abstract References Reviews Resources

Cuts, flows and gradient conditions on harmonic functions

Published 2022-06-27Version 1

Reduced cohomology motivates to look at harmonic functions which satisfy certain gradient conditions. If $G$ is a direct product of two infinite groups or a (FC-central)-by-cyclic group, then there are no harmonic functions with gradient in $c_0$ on its Cayley graphs. From this, it follows that a metabelian group $G$ has no harmonic functions with gradient in $\ell^p$. Furthermore, under a radial isoperimetric condition, groups whose isoperimetric profile is bounded by power of logarithms also have no harmonic functions with gradient in $\ell^p$.

Categories: math.GR, math.RT

Subjects: 31C05, 22D10, 20J06, 43A15, 05C81, 20F69

Keywords: harmonic functions, gradient conditions, radial isoperimetric condition, infinite groups, reduced cohomology motivates

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arXiv:2206.13275 [math.GR]Abstract References Reviews Resources

Cuts, flows and gradient conditions on harmonic functions

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arXiv:2206.13275 [math.GR]AbstractReferencesReviewsResources

Cuts, flows and gradient conditions on harmonic functions

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arXiv:2206.13275 [math.GR]Abstract References Reviews Resources