BMO and Dirichlet problem for semi-linear equations in the plane
DOI:
https://doi.org/10.12775/TMNA.2023.052Słowa kluczowe
BMO, bounded mean oscillation, FMO, finite mean oscillation, Dirichlet problem, semi-linear Beltrami equations, semi-linear Poisson type equations, generalized analytic functions with sources, generalized harmonic functions with sourcesAbstrakt
First we study the Dirichlet problem ${\rm{Re}}\omega(z)\to\varphi(\zeta)$ as $z\to\zeta,$ $z\in D,\zeta\in \partial D,$ with continuous boundary data $\varphi \colon \partial D\to\mathbb R$ for semi-linear Beltrami equations $\omega_{\overline{z}}-\mu(z) \omega_z=\sigma (z)q({\rm Re}\omega(z))$. We assume here that $D$ is an arbitrary bounded domain of the complex plane $\mathbb C$, which is either simply connected or has no boundary components degenerated to a single point, and that the equations are locally uniform elliptic with possible singularities at the boundary. For $\sigma\in L_p(D)$, $p> 2$, with compact support, and continuous $q\colon \mathbb R\to\mathbb C$, $q(t)/t\to 0$ as $t\to\infty$, we establish a series of effective criteria for existence of solutions of the Dirichlet problem in terms of BMO, FMO, Calderon-Zygmund, Lehto and Orlicz integral means. We also establish representation and regularity of these solutions. Then, we prove existence, representation and regularity of weak solutions of the Dirichlet problem $u(z)\to\varphi(\zeta)$ as $z\to\zeta,$ $z\in D,\zeta\in \partial D,$ to semi-linear Poisson type equations ${\rm div} [A(z)\nablau(z)] = g(z)Q(u(z))$ for $g\in L_p(D)$, $p> 1$, with compact support, and continuous $Q:\mathbb R\to\mathbb R$, $Q(t)/t\to 0$ as $t\to\infty$. We also assume here conditions on the matrix coefficients $A(z)$ guaranteing locally uniform ellipticity of these equations. Finally, we give examples of possible applications of the obtained results to various semi-linear equations of the mathematical physics in anisotropic and inhomogeneous media.Bibliografia
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Prawa autorskie (c) 2024 Vladimir Gutlyanskiĭ, Olga Nesmelova, Vladimir Ryazanov, Eduard Yakubov
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