18 citations to 10.1515/mcma-2015-0103 (Crossref Cited-By Service)
  1. Michael V. Klibanov, Jingzhi Li, Loc H. Nguyen, Vladimir Romanov, Zhipeng Yang, “Convexification Numerical Method for a Coefficient Inverse Problem for the Riemannian Radiative Transfer Equation”, SIAM J. Imaging Sci., 16, № 3, 2023, 1762  crossref
  2. Dmitriy Klyuchinskiy, Nikita Novikov, Maxim Shishlenin, “A Modification of Gradient Descent Method for Solving Coefficient Inverse Problem for Acoustics Equations”, Computation, 8, № 3, 2020, 73  crossref
  3. Dmitry V. Lukyanenko, Maxim A. Shishlenin, Vladimir T. Volkov, “Asymptotic analysis of solving an inverse boundary value problem for a nonlinear singularly perturbed time-periodic reaction-diffusion-advection equation”, Journal of Inverse and Ill-posed Problems, 27, № 5, 2019, 745  crossref
  4. S.I. Kabanikhin, M.A. Shishlenin, “Digital field”, Georesursy, 20, № 3, 2018, 139  crossref
  5. Bektemessov Maktagali, Temirbekova Laura, “Discretization of equations Gelfand-Levitan-Krein and regularization algorithms”, J. Phys.: Conf. Ser., 2092, № 1, 2021, 012015  crossref
  6. D.V. Lukyanenko, V.B. Grigorev, V.T. Volkov, M.A. Shishlenin, “Solving of the coefficient inverse problem for a nonlinear singularly perturbed two-dimensional reaction–diffusion equation with the location of moving front data”, Computers & Mathematics with Applications, 77, № 5, 2019, 1245  crossref
  7. V. G. Romanov, “On Justification of the Gelfand–Levitan–Krein Method for a Two-Dimensional Inverse Problem”, Sib Math J, 62, № 5, 2021, 908  crossref
  8. V. T. Volkov, N. N. Nefedov, “Asymptotic Solution of the Boundary Control Problem for a Burgers-Type Equation with Modular Advection and Linear Gain”, Comput. Math. and Math. Phys., 62, № 11, 2022, 1849  crossref
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