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- Autorius: Borbála Fazekas
- Leidėjas: Sudwestdeutscher Verlag Fur Hochschulschriften AG
- Metai: 2012
- Puslapiai: 152
- ISBN-10: 3838118340
- ISBN-13: 9783838118345
- Formatas: 15.2 x 22.9 x 0.9 cm, minkšti viršeliai
- Kalba: Anglų
Computer-assisted enclosures for fourth order elliptic equations (el. knyga) (skaityta knyga) | knygos.lt
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Aprašymas
"Concerning (partial) differential equations, amongst many others two questions are of great importance: existence and uniqueness, or more general multiplicity of solutions... There are plenty of equations, where analytical methods fail to work." The author describes in this work a computer-assisted method for proving existence and multiplicity of solutions of fourth order nonlinear elliptic boundary value problems. The main idea of this method is to compute a good numerical approximation of a solution and certain defect bounds with computer-assistance. Then a rigorous proof of the existence of an exact solution close to the numerical one is obtained by a fixed-point argument. The efficiency of this method is demonstrated with the examples of the fourth order Gelfand- and Emden-equations on various domains.
- Autorius: Borbála Fazekas
- Leidėjas: Sudwestdeutscher Verlag Fur Hochschulschriften AG
- Metai: 2012
- Puslapiai: 152
- ISBN-10: 3838118340
- ISBN-13: 9783838118345
- Formatas: 15.2 x 22.9 x 0.9 cm, minkšti viršeliai
- Kalba: Anglų
"Concerning (partial) differential equations, amongst many others two questions are of great importance: existence and uniqueness, or more general multiplicity of solutions... There are plenty of equations, where analytical methods fail to work." The author describes in this work a computer-assisted method for proving existence and multiplicity of solutions of fourth order nonlinear elliptic boundary value problems. The main idea of this method is to compute a good numerical approximation of a solution and certain defect bounds with computer-assistance. Then a rigorous proof of the existence of an exact solution close to the numerical one is obtained by a fixed-point argument. The efficiency of this method is demonstrated with the examples of the fourth order Gelfand- and Emden-equations on various domains.
Atsiliepimai