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Title: | A proof of the Khavinson conjecture in R<sup>3</sup> | Authors: | Melentijević, Petar | Affiliations: | Real and Functional Analysis | Keywords: | Bounded harmonic functions;Gradient of function;Khavinson problem;Radial derivative;Sharp estimate;Unit ball | Issue Date: | 20-Aug-2019 | Journal: | Advances in Mathematics | Abstract: | This paper deals with an extremal problem for bounded harmonic functions in the unit ball Bn. We solve the Khavinson conjecture in R3, an intriguing open question since 1992 posed by D. Khavinson, later considered in a general context by Kresin and Maz'ya. Precisely, we obtain the following inequality: [Formula presented] with ρ=|x|, thus sharpening the previously known with [Formula presented]. |
URI: | https://research.matf.bg.ac.rs/handle/123456789/559 | ISSN: | 00018708 | DOI: | 10.1016/j.aim.2019.06.025 |
Appears in Collections: | Research outputs |
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