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Tag Archives: mathematical physics
Applications of Functional Analysis in Mathematical Physics – Sobolev
In this post, we will see the book Applications of Functional Analysis in Mathematical Physics – S. L. Sobolev. About the book The present book arose as a result of revising a course of lectures given by the writer at … 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 Course of Higher Mathematics (Vols. 1 – 5) – Smirnov
In this post, we will see the six volume A Course of Higher Mathematics by V. I. Smirnov. About the Course Volume I Elementary Calculus is primarily concerned with differential and integral calculus. Particular emphasis is given to functional relationships … Continue reading
Posted in books, mathematics, physics, soviet
Tagged algebra, applied mathematics, bessel function, calculus, calculus of variation, classical field theory, complex integration, complex numbers, determinants, differential calculus, differential equations, elliptic functions, field theory, fractional functions, functional analysis, functions, Functions of Several Variables, hermitian polynomials, integral equations, integration, laguerre polynomials, line integrals, linear algebra, linear differential equations, linear transfor, linear transformations, mathematical physics, multiple integrals, partial differential equations, quadratic forms, seies, special functions, spherical functions, theory of groups, theory of integral equations, theory of limits, vector analysis
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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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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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The Differential Equations of Thermodynamics – Sychev
In this post, we will see the book The Differential Equations of Thermodynamics by V. V. Sychev. About the book Thermodynamics, as is known, is constructed quite simply. Two of its main laws have been established experimentally, and by applying … Continue reading
Posted in books, mathematics, mir books, mir publishers, physics
Tagged boundary curves, clausiusclapeyron equations, complex thermodynamic systems, critical point, differential equations, entropy, first law of thermodynamics, flow processes, gibbshelmholtz equations, heat capacities, isentrope, isolines, mathematical physics, maxwell equations, phase transitions, physics, second law of thermodynamics, simple systems, thermodynamic potentials, thermodynamic systems, theromodynamics
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Problems of Mathematical Physics – Lebedev, Skalsyaka, Uflyand
In this post, we will see the book Problems of Mathematical Physics by N. N. Lebedev; I. P. Skalsyaka; Y. S. Uflyand. About the book The aim of the present book is to help the reader acquire the proficiency needed … Continue reading
Posted in books, mathematics, physics, problem books, soviet
Tagged curvilinear coordinates, diffraction theory, eigenfunctions, elliptic, equations, fourier method, fourier transform, hankel transform, harmonic ocsillations, hyperbolic, inhomogenous problems, integral equations, integral transforms, laplace transform, mathematical physics, mellin transform, methods, paraboloidal coordinates, physics, physics problems and solutions, problems and solutions, special functions, toroidal coordinates, variational method
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