[KSCI] Korea Science Citation Index Service

http://dx.doi.org/10.4134/JKMS.2012.49.3.659

BEST CONSTANT IN ZYGMUND'S INEQUALITY AND RELATED ESTIMATES FOR ORTHOGONAL HARMONIC FUNCTIONS AND MARTINGALES

Osekowski, Adam (Department of Mathematics, Informatics and Mechanics University of Warsaw)

Publication Information

Journal of the Korean Mathematical Society / v.49, no.3, 2012 , pp. 659-670 More about this Journal

Abstract

For any $K$ > $2/{\pi}$ we determine the optimal constant $L(K)$ for which the following holds. If $u$ , $tilde{u}$ are conjugate harmonic functions on the unit disc with $\tilde{u}(0)=0$ , then ${\int}_{-\pi}^{\pi}{\mid}\tilde{u}(e^{i\phi}){\mid}\frac{d{\phi}}{2{\pi}}{\leq}K{\int}_{-\pi}^{\pi}{\mid}u(e^{i{\phi}}){\mid}{\log}^+{\mid}u(e^{i{\phi}}){\mid}\frac{d{\phi}}{2{\pi}}+L(K).$ We also establish a related estimate for orthogonal harmonic functions given on Euclidean domains as well as an extension concerning orthogonal martingales under differential subordination.

Keywords

harmonic function; martingale; LlogL inequality; differential sub-ordination; best constants;

Citations & Related Records

(Related Records In Web of Science)

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