Some inequalities for gradients of harmonic functions

Authors

  • Yu. A. Grigor'ev

Abstract

For a function u(x, y) harmonic in the upper half-plane y>0 and represented by the Poisson integral of a function v(t) ∈ L 2 (−∞,∞), we prove that the inequality \(grad u (x, y)|^2 {\text{ }} \leqslant {\text{ }}\frac{1}{{4\pi ^3 }}{\text{ }}\int\limits_{ - \infty }^\infty {v^2 } (t)dt\) is true. A similar inequality is obtained for a function harmonic in a disk.

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Published

25.08.1997

Issue

Vol. 49 No. 8 (1997)

Section

Short communications

How to Cite

Grigor'ev, Yu. A. “Some Inequalities for Gradients of Harmonic Functions”. Ukrains’kyi Matematychnyi Zhurnal, vol. 49, no. 8, Aug. 1997, pp. 1135–1136, https://umj.imath.kiev.ua/index.php/umj/article/view/5106.