Lipschitz invariance of walk dimension on connected self-similar sets
classification
🧮 math.DS
keywords
dimensionlipschitzwalkconnectedalforsanalysisapplicationcompact
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Walk dimension is an important conception in analysis of fractals. In this paper we prove that the walk dimension of a connected compact set possessing an Alfors regular measure is an invariant under Lipschitz transforms. As an application, we show some generalized Sierpi\'nski gaskets are not Lipschitz equivalent.
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