On the Dirichlet Problem to Elliptic Equation, the Order of which Degenerates at the Axis of a Cylinder

    Stasys Rutkauskas Info
DOI: https://doi.org/10.3846/13926292.2017.1362053

Abstract

In this article, an elliptic equation, which type degenerates (either weakly or strongly) at the axis of 3-dimensional cylinder, is considered. The statement of a Dirichlet type problem in the class of smooth functions is given and, subject to the type of degeneracy, the classical solutions are composed. The uniqueness of the solutions is proved and the continuity of the solutions on the line of degeneracy is discussed.

Keywords:

boundary value problems, degenerate, elliptic equation, second-order equation

How to Cite

Rutkauskas, S. (2017). On the Dirichlet Problem to Elliptic Equation, the Order of which Degenerates at the Axis of a Cylinder. Mathematical Modelling and Analysis, 22(5), 717-732. https://doi.org/10.3846/13926292.2017.1362053

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September 21, 2017
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Copyright (c) 2017 The Author(s). Published by Vilnius Gediminas Technical University.

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Published

2017-09-21

Issue

Vol 22 No 5 (2017)

Section

Articles

Copyright

Copyright (c) 2017 The Author(s). Published by Vilnius Gediminas Technical University.

License

Creative Commons License
This work is licensed under a Creative Commons Attribution 4.0 International License.

How to Cite

Rutkauskas, S. (2017). On the Dirichlet Problem to Elliptic Equation, the Order of which Degenerates at the Axis of a Cylinder. Mathematical Modelling and Analysis, 22(5), 717-732. https://doi.org/10.3846/13926292.2017.1362053

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