On generalized M. Riesz conjugate function theorem for harmonic mappings

Abstract

Let Lp(T) be the Lesbegue space of complex-valued functions defined in the unit circle T=\z: |z|=1\⊂eq C. In this paper, we address the problem of finding the best constant in the inequality of the form: \|(|P+ f|2+c| P- f|2)1/2\|Lp(T) Ap,c \|f\|Lp(T). Here 2 p<∞, c>0, and by P- f and P+ f are denoted co-analytic and analytic projection of a function f∈ Lp(T). The sharpness of the constant Ap,c follows by taking a family quasiconformal harmonic mapping fγ and letting γ 1/p. The result extends a sharp version of M. Riesz conjugate function theorem of Pichorides and Verbitsky and some well-known estimates for holomorphic functions.

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