On boundary-value problems for generalized analytic and harmonic functions

Authors

  • V.Ya. Gutlyanskiĭ Institute of Applied Mathematics and Mechanics of the NAS of Ukraine, Slov’yansk
  • O.V. Nesmelova Institute of Applied Mathematics and Mechanics of the NAS of Ukraine, Slov’yansk
  • V.I. Ryazanov Cherkasy National University
  • A.S. Yefimushkin Institute of Applied Mathematics and Mechanics of the NAS of Ukraine, Slov’yansk

DOI:

https://doi.org/10.15407/dopovidi2020.12.011

Keywords:

generalized analytic functions, generalized harmonic functions, logarithmic capacity and potential, Poincaré and Neumann boundary-value problems

Abstract

The present paper is a natural continuation of our last articles on the Riemann, Hilbert, Dirichlet, Poincaré, and, in particular, Neumann boundary-value problems for quasiconformal, analytic, harmonic functions and the so-called A-harmonic functions with arbitrary boundary data that are measurable with respect to the logarithmic capacity. Here, we extend the corresponding results to generalized analytic functions :h D → С with sources :g : ∂z-h = g ∈ Lp , p > 2 , and to generalized harmonic functions U with sources G : ΔU =G ∈Lp , p > 2 . Our approach is based on the geometric (functional-theoretic) interpretation of boundary values in comparison with the classical operator ap- proach in PDE. Here, we will establish the corresponding existence theorems for the Poincaré problem on direc- tional derivatives and, in particular, for the Neumann problem to the Poisson equations U GΔ = with arbitrary boundary data that are measurable with respect to the logarithmic capacity. A few mixed boundary-value problems are considered as well. These results can be also applied to semilinear equations of mathematical physics in aniso- tropic and inhomogeneous media.

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References

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Published

28.03.2024

How to Cite

Gutlyanskiĭ, V. ., Nesmelova, O. ., Ryazanov, V. ., & Yefimushkin, A. . (2024). On boundary-value problems for generalized analytic and harmonic functions . Reports of the National Academy of Sciences of Ukraine, (12), 11–18. https://doi.org/10.15407/dopovidi2020.12.011

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