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Tag Archives: mathematical physics
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, Hilbert-Schmidt Theorem, hyperbolic equations, integral equations, laplace equation, linear differential operators, mathematical physics, newtonian potential, parabolic equations, poisson equations, spherical functions, strum-lioville 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, clausius-clapeyron equations, complex thermodynamic systems, critical point, differential equations, entropy, first law of thermodynamics, flow processes, gibbs-helmholtz 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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Integral Equations In Elasticity – Parton, Perlin
In this post, we will look at the book Integral Equations In Elasticity by V. Z. Parton, P. I. Perlin. About the book This book presents the fundamentals of the theory of regular and singular integral equations in the case … Continue reading
Problems On The Equations Of Mathematical Physics – Smirnov
In this post we will see the book Problems On The Equations Of Mathematical Physics by M. M. Smirnov. About the book The aim of the present collection of problems is to illustrate the theory of partial differential equations as … Continue reading
Posted in books, mathematics, physics, problem books, soviet
Tagged canonical form, cauchy's method, elliptic, hyperbolic, mathematical physics, mathematics, method of characteristics, parabolic, partial differential equations, physics, problems and solutions, reduction, separation of variables
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Generalized Functions in Mathematical Physics – Vladimirov
In this post we will see the book Generalized Functions in Mathematical Physics by V. S. Vladimirov. About the book: … modern mathematical physics makes extensive use of the latest attainments of mathematics, one of which is the theory of … Continue reading
Equations of Mathematical Physics – Bitsadze
We now come to Equations of Mathematical Physics by A. V. Bitsazde. About the book: The present book consists of an introduction and six chapters. The introduction discusses basic notions and definitions of the traditional course of mathematical physics and … Continue reading
Posted in books, mathematics, mir books, mir publishers, physics
Tagged boundary conditions, cauchy riemann system, cauchy's theorem, dirichlet problem, elliptic linear PDE, fredholm theorems, green's function, heat equation, hyperbolic pde, integral equations, laplace equation, linear, mathematical physics, parabolic pde, partial differential equations, pde, poisson firmula, potential function
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