Groups with minimal harmonic functions as small as you like (With an appendix by Nicolas Matte Bon)
Abstract
For any order of growth f(n)=o( n) we construct a finitely-generated group G and a set of generators S such that the Cayley graph of G with respect to S supports a harmonic function with growth f but does not support any harmonic function with slower growth. The construction uses permutational wreath products in which the base group is defined via its properly chosen Schreier graph.
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