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ЖУРНАЛЫ // Eurasian Mathematical Journal // Архив

Eurasian Math. J., 2018, том 9, номер 2, страницы 54–67 (Mi emj297)

Эта публикация цитируется в 4 статьях

On fundamental solutions of a class of weak hyperbolic operators

V. N. Margaryanab, H. G. Ghazaryanab

a Institute of Mathematics the National Academy of Sciences of Armenia, 0051 Yerevan, Armenia
b Department of Mathematics and Mathematical Modeling, Russian-Armenian University, 123 Ovsep Emin St, 0051 Yerevan, Armenia

Аннотация: We consider a certain class of polyhedrons $\mathfrak{R}\subset\mathbb{E}^n$, multi-anisotropic Jevre spaces $G^{\mathfrak{R}}(\mathbb{E}^n)$, their subspaces $G_0^{\mathfrak{R}}(\mathbb{E}^n)$, consisting of all functions $f\in G^{\mathfrak{R}}(\mathbb{E}^n)$ with compact support, and their duals $(G_0^{\mathfrak{R}}(\mathbb{E}^n))^*$. We introduce the notion of a linear differential operator $P(D)$, $h_{\mathfrak{R}}$-hyperbolic with respect to a vector $N\in\mathbb{E}^n$, where $h_{\mathfrak{R}}$ is a weight function generated by the polyhedron $\mathfrak{R}$. The existence is shown of a fundamental solution $E$ of the operator $P(D)$ belonging to $(G_0^{\mathfrak{R}}(\mathbb{E}^n))^*$ with $\mathrm{supp}\, E\subset\overline{\Omega_N}$, where $\Omega_N:=\{x\in\mathbb{E}^n, (x, N)>0\}$. It is also shown that for any right-hand side $f\in G^{\mathfrak{R}}(\mathbb{E}^n)$ with the support in a cone contained in $\overline{\Omega_N}$ and with the vertex at the origin of $\mathbb{E}^n$, the equation $P(D)u = f$ has a solution belonging to $G^{\mathfrak{R}}(\mathbb{E}^n)$.

Ключевые слова и фразы: hyperbolic with weight operator (polynomial), multianisotropic Jevre space, Newton polyhedron, fundamental solution.

MSC: 12E10

Поступила в редакцию: 13.03.2017

Язык публикации: английский



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