Avoiding σ-porous sets in Hilbert spaces
classification
🧮 math.FA
keywords
curveshilbertmeasureporoussetsavoidingconstructivediscover
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We give a constructive proof that any $\sigma$-porous subset of a Hilbert space has Lebesgue measure zero on typical $C^{1}$ curves. Further, we discover that this result does not extend to all forms of porosity; we find that even power-$p$ porous sets may meet many $C^{1}$ curves in positive measure.
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