Abstract
A mixed problem for a first-order differential system with two independent variables and a continuous potential, the corresponding spectral problem for which is the Dirac system, is studied. Using a special transformation of the formal solution and refined asymptotics of the eigenfunctions, the classical solution of the problem is obtained. No excessive conditions on the smoothness of the initial data are imposed. In the case of an arbitrary square summable function, a generalized solution is obtained.
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REFERENCES
P. V. Djakov and B. S. Mityagin, “Instability zones of periodic 1-dimensional Schrödinger and Dirac operators,” Russ. Math. Surv. 61 (4), 663–766 (2006).
P. Djakov and B. Mityagin, “Bari–Markus property for Riesz projections of 1D periodic Dirac operators,” Math. Nachr. 283 (3), 443–462 (2010).
A. G. Baskakov, A. V. Derbushev, and A. O. Shcherbakov, “The method of similar operators in the spectral analysis of non-self-adjoint Dirac operators with nonsmooth potentials,” Izv. Math. 75 (3), 445–469 (2011).
A. M. Savchuk and I. V. Sadovnichaya, “Asymptotic formulas for fundamental solutions of the Dirac system with complex-valued integrable potential,” Differ. Equations 49 (5), 545–556 (2013).
A. M. Savchuk and A. A. Shkalikov, “Dirac operator with complex-valued summable potential,” Math. Notes 96 (5–6), 777–810 (2014).
I. V. Sadovnichaya, “\({{L}_{\mu }} \to {{L}_{\nu }}\) equiconvergence of spectral decompositions for a Dirac system with \({{L}_{\kappa }}\) potential,” Dokl. Math. 93 (2), 223–226 (2016).
M. Sh. Burlutskaya, V. P. Kurdyumov, and A. P. Khromov, “Refined asymptotic formulas for eigenvalues and eigenfunctions of the Dirac system,” Dokl. Math. 85 (2), 240–242 (2012).
M. Sh. Burlutskaya, V. P. Kurdyumov, and A. P. Khromov, “Refined asymptotic formulas for eigenvalues and eigenfunctions of the Dirac system with a nondifferentiable potential,” Izv. Sarat. Univ. Nov. Ser. Mat. Mekh. Inf. 12 (3), 22–30 (2012).
M. Sh. Burlutskaya, V. V. Kornev, and A. P. Khromov, “Dirac system with a nondifferentiable potential and periodic boundary conditions,” Zh. Vychisl. Mat. Mat. Fiz. 52 (9), 1621–1632 (2012).
A. I. Vagabov, Introduction to the Spectral Theory of Differential Operators (Rostov. Gos. Univ., Rostov-on-Don, 1994) [in Russian].
M. Sh. Burlutskaya, “Mixed problem for a system of first-order differential equations with a continuous potential,” Izv. Sarat. Univ. Nov. Ser. Mat. Mekh. Inf. 16 (2), 145–151 (2016).
M. Sh. Burlutskaya and A. P. Khromov, “Fourier method in an initial–boundary value problem for a first-order partial differential equation with involution,” Comput. Math. Math. Phys. 51 (12), 2102–2114 (2011).
A. P. Khromov and M. Sh. Burlutskaya, “Classical Fourier solutions of mixed problems under minimal requirements for initial data,” Izv. Sarat. Univ. Nov. Ser. Mat. Mekh. Inf. 14 (2), 171–198 (2014).
A. N. Krylov, On Some Differential Equations of Mathematical Physics Having Applications in Engineering (GITTL, Leningrad, 1950) [in Russian].
V. A. Chernyatin, Substantiation of the Fourier Method in Mixed Problems for Partial Differential Equations (Mosk. Gos. Univ., Moscow, 1991) [in Russian].
A. P. Khromov, “Behavior of the formal solution to a mixed problem for the wave equation,” Comput. Math. Math. Phys. 56 (2), 243–255 (2016).
M. Sh. Burlutskaya and A. P. Khromov, “Mixed problem for the wave equation with integrable potential in the case of two-point boundary conditions of distinct orders,” Differ. Equations 53 (4), 497–5085 (2017).
ACKNOWLEDGMENTS
This work was supported by the Russian Science Foundation, project no. 16-11-10125.
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Translated by E. Chernokozhin
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Burlutskaya, M.S. Classical and Generalized Solutions of a Mixed Problem for a System of First-Order Equations with a Continuous Potential. Comput. Math. and Math. Phys. 59, 355–365 (2019). https://doi.org/10.1134/S0965542519030059
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DOI: https://doi.org/10.1134/S0965542519030059