- Tytuł:
- Equivalence of the local Markov inequality and a Kolmogorov type inequality in the complex plane
- Autorzy:
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Białas-Cież, Leokadia
Eggink, Raimondo - Opis:
- We prove that a compact subset of the complex plane satisfies a local Markov inequality if and only if it satisfies a Kolmogorov type inequality. This result generalizes a theorem established by Bos and Milman in the real case. We also show that every set satisfying the local Markov inequality is a sum of Cantor type sets which are regular in the sense of the potential theory.
- Dostawca treści:
- Repozytorium Uniwersytetu Jagiellońskiego
Artykuł