Pointwise regularity and irregularity of energy densities on N-dimensional Sierpinski gaskets
classification
🧮 math.AP
math.PR
keywords
kusuokameasurepointwisedensitiesdensitydimensionaledgeenergy
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We study the pointwise regularity of energy densities associated with harmonic functions on the $N$-dimensional Sierpinski gasket $(N\ge 2)$ with respect to the Kusuoka measure. For any nonconstant harmonic function, we prove that every Borel representative of the density is discontinuous at every point of a set of full Kusuoka measure. In sharp contrast, on each one-dimensional edge of the gasket -- itself a set of zero Kusuoka measure -- the density admits a canonical pointwise version, which is $\gamma_N$-H\"older continuous on that edge with the explicit and optimal exponent $\gamma_N=\log_2 \{(\sqrt{4N+5}+1)/(\sqrt{4N+5}-1)\}$.
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