Solution of boundary value problems for one degenerate \(B\)-elliptic equation of the second kind by the method of potentials (Q2479646)
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| Language | Label | Description | Also known as |
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| English | Solution of boundary value problems for one degenerate \(B\)-elliptic equation of the second kind by the method of potentials |
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Solution of boundary value problems for one degenerate \(B\)-elliptic equation of the second kind by the method of potentials (English)
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1 April 2008
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The boundary value problems of Dirichlet and Neumann types for the degenarate B-elliptic equation \(B_{x} u +y^{m} u_{yy}=0\) are considered in the work, where \(B_{x}\) is the Bessel operator. Four existence theorems are formulated. Properties of single and double layer potentials associated with the equation are discussed in section 4. Then, a reduction of BVP to an integral equation is made in Sections 5 and 6.
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degenerate elliptic equations
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Dirichlet problem
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Neumann problem
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