Classical solution by the Fourier method of mixed problems with minimum requirements on the initial data

1. Steklov V. A. Osnovnye zadachi matematicheskoi fiziki [The main tasks of mathematical physics]. Moscow, Nauka, 1983. 432 p. (in Russian). 2. Petrovsky I. G, Lectures on partial differential equations. Dover Publ. Inc., 1992, 245 p. (Rus. ed. : Petrovskii I. G. Lektsii ob uravneniiakh s chastnymi proizvodnymi. Moscow, GITTL, 1953, 360 p.). 3. Smirnov V. I. Kurs vysshei matematiki [A Course of Higher Mathematics : in 5 vol., vol. 4]. Moscow, Gostekhizdat, 1953. 804 p. (in Russian). 4. Ladyzhenskaya O. A. Smeshannaia zadacha dlia giperbolicheskogo uravneniia [Mixed problem for a hyperbolic equation]. Moscow, Gostekhizdat, 1953, 282 p. (in Russian). 5. Il’in V. A. Izbrannye trudy [Selected works : in 2 vol.]. Moscow, OOO «Maks-press», 2008, vol. 1 727 p. (in Russian). 6. Il’in V. A. The solvability of mixed problems for hyperbolic and parabolic equations. Rus. Math. Surv., 1960, vol. 15, iss. 1, pp. 85–142. 7. Chernyatin V. A. Obosnovanie metoda Fur’e v smeshannoi zadache dlya uravnenii v chastnykh proizvodnykh [Justification of the Fourier method in a mixed problem for partial differential equations]. Moscow, Moscow Univ. Press, 1991. 112 p. (in Russian). 8. Krylov A. N. O nekotorykh differentsial’nykh uravneniiakh matematicheskoi fiziki, imeiushchikh prilozheniia v tekhnicheskikh voprosakh [On some differential equations of mathematical physics with applications in technical matters]. Leningrad, GITTL, 1950. 368 p. (in Russian). 9. Krylov A. N. Lektsii o priblizhennykh vychisleniiakh [Lectures on approximate calculations]. Moscow; Leningrad, GITTL, 1950. 398 p. (in Russian). 10. Lanczos C. Discourse of Fourier Series. Edinburgh; London, Oliver and Boyd, Ltd., 1966, 255 p. 11. Nersesyan A. B. Acceleration of convergence of eigenfunction expansions. Dokl. NAN Armenii, 2007, vol. 107, no. 2, pp. 124–131 (in Russian). 12. Chernyatin V. A. To clarify the theorem of existence of the classical solution of the mixed problem for onedimensional wave equation. Differential Equations, 1985, vol. 21, no. 9, pp. 1569–1576 (in Russian). 13. Chernyatin V. A. To the decision of one of the mixed problem for an inhomogeneous equation with partial derivatives of fourth order. Differential Equations, 1985, vol. 21, no. 2, pp. 343–345 (in Russian). 14. Chernyatin V. A. On necessary and sufficient conditions for the existence of the classical solution of the mixed problem for one-dimensional wave equation. Dokl. AN SSSR, 1986, vol. 287, no. 5. pp. 1080–1083 (in Russian). 15. Chernyatin V. A. Classical solution of the mixed problem for the inhomogeneous hyperbolic equation. Chislen-nye metody resheniia kraevykh i nachal’nykh zadach dlia differentsial [Numerical methods for solving boundary value and initial problems for differential equations]. Moscow, Moscow Univ. Press, 1986, pp. 17–36. 16. Chernyatin V. A. To clarify the existence theorem for solutions of the mixed problem for the inhomogeneous heat equation. Chislennyi analiz : metody, algoritmy, programmy [Numerical analysis : methods, algorithms, programs]. Moscow, Moscow Univ. Press, 1988, pp. 126–132 (in Russian). 17. Chernyatin V. A. On the solvability of the mixed problem for the inhomogeneous hyperbolic equations. Differential Equations. 1988, vol. 24, no. 4, pp. 717–720 (in Russian). 18. Andreev A. A. About the correctness of boundary problems for some equations with calimanesti shift. Differentsial’nye uravneniia i ikh prilozheniia : trudy 2-go mezhdunarodnogo seminara [Differential equations