Initial-Boundary-Value Problem for an Integrodifferential Equation of the Third Order
Assanova A.T. Vasilina G.K. Imanchiev A.E.
February 2021Springer
Journal of Mathematical Sciences (United States)
2021#253Issue 2181 - 203 pp.
We study the initial-boundary-value problem for an integrodifferential equation of the third order. Replacing the required function and its time derivative by a combination of two new unknown functions, we reduce this problem to an equivalent problem in the form of a family of multipoint problems for a system of two Volterra integrodifferential equations of the first order and integral relations. We construct algorithms for finding the solution of the equivalent problem. By the method of parametrization, we establish the conditions for the unique solvability of a family of multipoint problems for the system of first-order Volterra integrodifferential equations in terms of the initial data. We also establish the conditions for the existence of the unique classical solution of the initial-boundary-value problem for the integrodifferential equation of the third order in terms of the coefficients of this equation and boundary functions.
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Institute of Mathematics and Mathematical Modelling, Pushkin Str., 125, Almaty, 050010, Kazakhstan
Almaty University of Power Engineering and Telecommunications, Baitursynuly Str., 126, Almaty, 050013, Kazakhstan
Zhubanov Aktyubinsk Regional State University, Moldagulova Ave., 34-A, Aktobe, 030000, Kazakhstan
Institute of Mathematics and Mathematical Modelling
Almaty University of Power Engineering and Telecommunications
Zhubanov Aktyubinsk Regional State University
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