Riesz Theorem and Riesz-Fejér inequality for weighted harmonic Bergman spaces with applications to Möbius invariant spaces

Abstract

The aim of this paper is twofold. First, we establish a Riesz conjugate theorem for weighted harmonic Bergman spaces. More precisely, we prove that if f=u+iv is a harmonic K-quasiregular mapping in D and the real part u belongs to the weighted harmonic Bergman space aαp, 0<p<∞, then the imaginary part v also belongs to the same space, together with a quantitative norm estimate. Moreover, for 1<p<∞, the corresponding constant is shown to be independent of the weight parameter α. Second, we establish Riesz--Fejér inequalities for weighted harmonic Bergman spaces for 1<p<∞. In the special case p=2, we further improve the corresponding constant by using the Hilbert space structure and orthogonality techniques. As applications of our main results, we establish Riesz conjugate theorems and Riesz--Fejér inequalities for the Möbius invariant spaces Q(n,p,α) introduced by Zhu [Illinois J. Math. 51 (2007), pp. 977--1002] and their harmonic counterparts Qh(n,p,α) introduced by Sun, Liu, and Wang [Potential Anal. 65 (2026), Article no. 12].

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