The paper considers a new approach to constructing generalized solutions of degenerate integro-differential equations convolution type in Banach spaces. The principal idea of the method proposed implies the refusal of the condition of existence of the full Jordan set for the Fredholm operator of the higher derivative with respect to the operator bundle formed by the rest of operator coefficients of the differential part and by the operator kernel of the integral component of the equation. The conditions are superimposed upon the values of the operator function specially constructed on the basis elements of the Fredholm operator kernel. Under such an approach, the differential part of the equation may include not only the higher derivative but also any combination lower derivatives, what allows one to consider the convolution integral-differential equations from universal positions, without any special account of the structure of the structure of the operator bundle. The method proposed represents a form of generalization of the technique based on the application of Jordan sets of Fredholm operators, and in the case of existence of the latter the method coincides with this technique. The generalized solutions are constructed in the form of a convolution of the fundamental operator function, which corresponds to the equation under investigation, and a function, which includes the right-hand side of the equation and the initial data. The conditions, under which such a generalized solution does not contain any singular component, and the regular component converts the initial equation into an identity and satisfies the initial data, and the result will provide for the resolvability of the initial problem in the class of functions of characterized by the respective smoothness. In this case, the generalized solution constructed will be classical. The theorem on the form of fundamental operator function has been proved, the abstract results have been illustrated via examples of initialboundary value problems of applied character from the theory electromagnetic fields, the theory of oscillations in visco-elastic media, the theory of vibrations of thermal-elastic plates.

Mihail Falaleev, Dr. Sci. (Phys.–Math.), Prof., Irkutsk State University, 1, K. Marx st., Irkutsk, 664003, Russian Federation, tel.: (3952)521296, email: mihail@ic.isu.ru

Falaleev M.V. On Solvability in the Class of Distributions of Degenerate Integro-Differential Equations in Banach Spaces. The Bulletin of Irkutsk State University. Series Mathematics, 2020, vol. 34, pp. 77-92. (in Russian) https://doi.org/10.26516/1997-7670.2020.34.77

1. Weinberg M.M., Trenogin V.A. Theory of branching solutions of nonlinear equations. Moscow, Nauka Publ., 1969. 520 p. (in Russian)
2. Vladimirov V.S. Generalized functions in mathematical physics. Moscow, Nauka Publ., 1979. 512 p. (in Russian)
3. Loginov B.V., Rusak Y.B. The Generalized Jordanova structure in branching theory. Direct and inverse problems for partial differential equations and their applications. Tashkent, FAN, 1978, pp. 133-148. (in Russian)
4. Sveshnikov A.G., Alshin A.B., Korpusov M.O., Pletner Yu.D. Linear and nonlinear Sobolev type equations. Мoscow, Nauka Publ., 2007. 736 p. (in Russian)
5. Sidorov N.A., Romanova O.A. On the application of some results of the branch theory in solving differential equations with degeneracy. Differential equations, 1983, vol. 19, no. 9. pp. 1516-1526. (in Russian)
6. Sidorov N.A., Falaleev M.V. Generalized solutions of differential equations with a Fredholm operator for a derivative. Differential equations, 1987, vol. 23, no. 4, pp. 726-728. (in Russian)
7. Falaleev M.V., Orlov S.S. Degenerate integro-differential operators in Banach spaces and their applications. Izvestiya vuzov. Mathematics, 2011, no. 10, pp. 68-79. (in Russian)
8. Falaleev M.V., Orlov S.S. Integro-differential equations with degeneracy in Banach spaces and their applications in the mathematical theory of elasticity. The Bulletin of Irkutsk State University. Series Mathematics, 2011, vol. 4, no. 1, pp. 118-134. (in Russian)
9. Falaleev M.V., Orlov S.S. Generalized solutions of degenerate integro-differential equations in Banach spaces and their applications. Proceedings of the Institute of mathematics and mechanics of the Ural Branch of the Russian Academy of Sciences, 2012, vol. 18, no. 4, pp. 286-297. (in Russian)
10. Rivera J.E.M., Fatori L.H. Regularizing Properties and Propagations of Singularities for Thermoelastic Plates. Math. Meth. Appl. Sci., 1998, vol. 21, pp. 797-821.
11. Sidorov N., Loginov B., Sinitsyn A. and Falaleev M. Lyapunov-Schmidt Methods in Nonlinear Analysis and Applications. Dordrecht, Kluwer Academic Publishers, 2002, 540 p. https://doi.org/10.1007/978-94-017-2122-6