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Markov's inequality on Koornwinder's domain in L^p norms

By Tomasz Beberok
Let \Omega=\{(x,y) \in \mathbb{R}^2 : |x|<y+1, \, x^2>4y\}. We prove that the optimal exponent in Markov's inequality on \Omega in L^p norms is 4.
January 22, 2019
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Markov's inequality on Koornwinder's domain in $L^p$ norms
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