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Volterra integral equation method for solving some hyperbolic equation problems

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dc.contributor.author Yakhno, Valery G.
dc.contributor.author Işık, Ali
dc.date.accessioned 2016-12-30T08:49:40Z
dc.date.available 2016-12-30T08:49:40Z
dc.date.issued 2003
dc.identifier.citation Yakhno, V. G., Işık, A. (2003). Volterra integral equation method for solving some hyperbolic equation problems. Selcuk Journal of Applied Mathematics, 4 (2), 103-112. tr_TR
dc.identifier.issn 1302-7980
dc.identifier.uri http://hdl.handle.net/123456789/3611
dc.description url: http://sjam.selcuk.edu.tr/sjam/article/view/130 tr_TR
dc.description.abstract The Cauchy problem for a hyperbolic equation with function coefficients of the first partial derivatives with respect to time and space variables is considered. It is proved by Sobolev's method that solution of this problem satisfies a 3-D Volterra integral equation. Using this fact the uniqueness theorem for an inverse problem is proved. tr_TR
dc.language.iso en tr_TR
dc.publisher Selcuk University Research Center of Applied Mathematics tr_TR
dc.subject Ters problem tr_TR
dc.subject Inverse problem tr_TR
dc.subject Volterra integral denklemi tr_TR
dc.subject Volterra integral equation tr_TR
dc.subject Cauchy problemi tr_TR
dc.subject Cauchy problem tr_TR
dc.subject İkinci dereceden hiperbolik denklemler tr_TR
dc.subject Hyperbolic equation of the second order tr_TR
dc.title Volterra integral equation method for solving some hyperbolic equation problems tr_TR
dc.type Article tr_TR
dc.relation.journal Selcuk Journal of Applied Mathematics
dc.identifier.volume 4
dc.identifier.startpage 103
dc.identifier.endpage 112


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