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Inverse boundary-value problems of cauchy type for harmonic functionsWe apply two methods for solving the inverse boundary-value problem (the so-called problem (A
A Method for Constructing Asymptotic Expansions of Bisingularly Perturbed ProblemsIn this paper we propose an analog of the method of boundary functions for constructing uniform
A Method for Constructing Asymptotic Expansions of Bisingularly Perturbed ProblemsIn this paper we propose an analog of the method of boundary functions for constructing uniform
Inverse boundary-value problems of cauchy type for harmonic functionsWe apply two methods for solving the inverse boundary-value problem (the so-called problem (A
Parametric bases for elliptic boundary value problemWe consider the calculation schemes in the framework of Kantorovich method that consist
Inverse Sturm–Liouville Problem with Spectral Parameter in the Boundary Conditions of the spectral parameter in the first boundary condition and with entire analytic functions in the second one
Isoperimetric properties of Euclidean boundary moments of a simply connected domain symmetrization method. For L p -norms of the distance function we prove an analog of the Payne inequality
On capacity computation for symmetric polygonal condensers. These two methods are based respectively on the use of the Lauricella function (Bezrodnykh and Vlasov, 2002
Parametric basis functions for collective nuclear models of the new parametric surface basis functions in an analytical form for solving the boundary-value problem
Representation of Green’s functions of the wave equation on a segment in finite terms; [Представление функций Грина волнового уравнения на отрезке в конечном виде] of Heaviside functions. A. N. Krylov’s method of accelerating the convergence of Fourier series for several
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