Particular solutions of the multidimensional singular ultrahyperbolic equation generalizing the telegraph and Helmholtz equations
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Bulletin of the Karaganda University
Abstract
This article deals with the construction of particular solutions for a second-order multidimensional singular
partial differential equation, which generalizes the famous telegraph and Helmholtz equations. The
constructed particular solutions are expressed in terms of the multiple confluent hypergeometric function,
which is analogous to the multiple Lauricella function and the famous Bessel function. A limit correlation
theorem for the multiple confluent hypergeometric function is proved, and a system of partial differential
equations associated with the confluent function is derived. Thanks to the proven properties of the multiple
confluent hypergeometric function. The particular solutions of the multidimensional partial differential
equation with the singular coefficients are written in explicit forms and it is determined that these solutions
have a singularity at the vertex of a multidimensional cone.
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Arzikulov Z.O. Particular solutions of the multidimensional singular ultrahyperbolic equation generalizing the telegraph and Helmholtz equations/ Z.O. Arzikulo, T.G. Ergashev //Bulletin of the Karaganda University. Mathematics series . – 2025. – № 2(118). – pp. 16-27