On the Best Exponent in Markov Inequality |
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Authors: | Mirosław Baran Leokadia Białas-Cież Beata Milówka |
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Affiliation: | 1. Faculty of Mathematics and Computer Science, Institute of Mathematics, Jagiellonian University, ?ojasiewicza 6, 30-348, Kraków, Poland 2. State Higher Vocational School in Tarnow, Institute of Mathematical and Natural Science, Mickiewicza 8, 33-100, Tarnów, Poland
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Abstract: | Let E be a compact set preserving the Markov inequality and m(E) be its best exponent i.e., m(E) is the infimum of all possible exponents in this inequality on E. It is known that $alpha (E) le frac1{m(E)}$ where α(E) is the best exponent in Hölder continuity property of the (pluri)complex Green function (with pole at infinity) of E. We show that if E???? N (or ? N ) with N?≥?2 then the Markov inequality need not be fulfilled with m(E). We also construct a set E????2 such that the Markov inequality holds at the tip of exponential cusps composing E but for the whole set E we have m(E)?=?∞. Moreover, we prove that sup m(E)?=?∞ where the supremum is taken over all compact sets E???? preserving the Markov inequality. Finally, we prove that if E is a Markov set in ? then its image F(E) under a holomorphic mapping F is a Markov set too. More precisely, we prove that $m(F(E))leq m(E)cdot Big(1+ maxlimits_{ partial Ecap{F'(t)=0}}textrm{ord}_t F'Big)$ . |
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