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О приближенном решении некорректно поставленной смешанной краевой задачи для уравнения Лапласа в цилиндрической области с однородными условиями второго рода на боковой поверхности цилиндра approximate solution to the integral equation was constructed using the Tikhonov regularization method
Об одной некорректно поставленной краевой задаче для уравнения Лапласа в круговом цилиндре equation in a circle. A stable solution of the integral equation is obtained by the Tikhonov regularization
Minimum Principle for the Tikhonov Functional in the Problem of Stable Continuation of a Potential Field from a Surface-section. Tikhonov’s regularization method is used to construct a stable solution of the problem.
Linear inverse problem of the metaharmonic potential for bodies of constant thickness in the potential data is constructed on the basis of the Tikhonov regularization method as an extremal
Устойчивое продолжение метагармонических функций с границы в четно-периодической модели задачи коррекции тепловизионных изображений in the potential data is constructed on the basis of the Tikhonov regularization method as an extremal
Descent method for monotone mixed variational inequalities mapping and a convex nondifferentiable function. We apply the Tikhonov-Browder regularization technique
On a modification of the Hamming method for summing discrete Fourier series and its application to solve the problem of correction of thermographic images regularization method. The main part of the constructed approximate solution is presented as a Fourier series
Numerical solution of the inverse Newtonian potential problem for bodies of constant thickness with data on the plane that is resistant to errors in the potential data is constructed as an extremal of the Tikhonov functional
Partitionable variational inequalities with multi-valued mappings. Following a parametric coercivity approach, we obtain convergence of the Tikhonov regularization method
CONTINUATION OF POTENTIAL FIELD FROM SURFACE OF GENERAL FORM regularization method.
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