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Tag Archives: boundary value problems
Analytical Heat Diffusion Theory – Luikov
In this post, we will see the book Analytical Heat Diffusion Theory by A. V. Luikov. About the book This work is a revised edition of an earlier book by Academician Luikov which was widely used throughout the Soviet Union … Continue reading
Partial Differential Equations of Mathematical Physics – Sobolev
In this post, we will see the book Partial Differential Equations of Mathematical Physics – S. L. Sobolev. About the book The classical partial differential equations of mathematical physics, formulated and intensively studied by the great mathematicians of the nineteenth … Continue reading
Posted in books, mathematics, physics
Tagged boundary value problems, d’Alembert's Method, differential equations, dirichlet problem, equation of heat conduction, fourier series, fouriers method, green's formula, hadamard's example, integral equations, laplace's equation, lebesgue integration, mathematical physics, method of separation of variables, Ostrogradski’s Formula, physics, poisson's equation, potential problems, riemann's method, soviet, spherical functions, vibrations
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Partial Differential Equations Of Mathematical Physics (Vols. 1 and 2) – Tychonov, Samarski
In this post, we will see the two set volume of Partial Differential Equations Of Mathematical Physics by A. N. Tychonov; A. A. Samarski. About the books This text reflects the authors’ unique approach to the study of the basic … Continue reading
Posted in books, mathematics, physics, soviet
Tagged applications, boundary value problems, elliptic differential equations, heat propagation, hyperbolic differential equations, mathematical physics, parabolic differential equations, partial differential equations, physics, soviet, special functions, wave propagation
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A Collection Of Problems On Mathematical Physics – Budak, Samarskii, Tikhonov
In this post, we will see the book A Collection Of Problems On Mathematical Physics by B. M. Budak; A. A. Samarskii; A. N. Tikhonov. About the book THE PRESENT book is based on the practical work with equations of … Continue reading
Posted in books, mathematics, physics, soviet
Tagged boundary value problems, canonical forms, determinants, electric fields, elliptical, gamma function, heat conduction, heat transfer, hyperbolic, laplace's equation, mathematics, media, natural oscillations, oscillations, parabolic, partial differential equations, physics, problem books, propagation of sound, riemann's method, second order, solutions, soviet, special functions, temperature distribution, vibrations
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The Inverse Problem of Scattering Theory – Agranovich, Marchenko
In this post, we will see the book The Inverse Problem of Scattering Theory by Z. S. Agranovich and V. A. Marchenko. About the book In spectral theory, the inverse problem is the usual name for any problem in which … Continue reading
Posted in books, mathematics, physics
Tagged boundary value problems, inverse problems, kleingordon scalar relativistic wave equation, mathematical physics, mathematical theory, mathematics, parsevals equaliity, physics, potential matrrix, scattering data, scattering matrix, scattering problem, singularities, solutions, spectral theory
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Potential Theory and Its Application to Basic Problems of Mathematical Physics – Günter
In this post, we will see the book Potential Theory and Its Application to Basic Problems of Mathematical Physics by N. M. Günter. About the book The present book is the translation of N. M. Günter’s monograph “La théorie du … Continue reading
Posted in books
Tagged applications, boundary value problems, differential equations, dirichlet problem, eigenfunctions, eigenvalues, gauss formula, gauss integral, green's functions, heat problem, mathematical physics, mathematics, neumann problem, newtonian potential, nuemann problem, physics, poisson equation, potential theory, robin problem, solutions, stokes formula
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Computational Mathematics – Danilina, Dubrovskaya, Kvasha, Smirnov
In this post, we will see the book Computational Mathematics by N. I. Danilina; N. S. Dubrovskaya; O. P. Kvasha; G. L. Smirnov. About the book The rapid development of computer engineering in recent times has led to ail expansion … Continue reading
Posted in books, mathematics, mir books, mir publishers, science, technology
Tagged adam's extrapolation method, approximate methods, approximate solutions, boundary value problems, Characteristic Polynomial, Cholesky's Method, computational methods, Danilevsky's Method, difference scheme, Eigenvalues and Eigenvectors of a Matrix, elementary functions, euler's method, extrapolation, Gauss Elimination Method, Horner's Method, interpolation, iterative methods, Krylov's Method, LeverrierFaddeev Method, linear vector spaces, matrix algebra, method of finite differences, Methods of Solving Nonlinear Equations, milne's method, Newton's Method of Approximation, NewtonCotes Quadrature Formulas, Numerical Differentiation and Integration, numerical methods, ordinary diff, ordinary differential equations, partial differential equations, picard's method, power series, quadrature formula, rungekutta method, solutions, systems of linear equations, Theory of Errors
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A Collection of Problems on the Equations of Mathematical Physics – Vladimirov
In this post, we will see the book A Collection of Problems on the Equations of Mathematical Physics edited by V. S. Vladimirov. The contributors to the book include V .S. Vladimirov, V .P . Mikhailov, A. A. Vasharin, Kh. Kh.Karimova, … Continue reading
Posted in books, mathematics, mir books, mir publishers, physics, problem books
Tagged boundary value problems, cauchy problems, differential equations, fourier transform, function spaces, generalised functions, green's function, integral equations, laplace transform, mathematical, partial differential equations, physics, physics problems and solutions, problem books, problem solving, SturmLiouville Problem, variational methods
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Equations of Mathematical Physics – Vladimirov
In this post, we will see the book Equations of Mathematical Physics by V. S. Vladimirov. About the book This book examines classical boundary value problems for differentia equations of mathematical physics. Instead of the traditional means of presentation, we … Continue reading
Posted in books, mathematics, physics, soviet
Tagged boundary value problems, cauchy problem, differential equations, dirichlet, dirichlet problem, elliptic equations, fourier method, Fredholm’s Theorems, Functions of Slow Growth, generalized functions, green's function, heat equation, helmholtz equation, HilbertSchmidt Theorem, hyperbolic equations, integral equations, laplace equation, linear differential operators, mathematical physics, newtonian potential, parabolic equations, poisson equations, spherical functions, strumlioville problem, tempered distributions
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