Integral Representations For Spatial Models of Mathematical PhysicsCRC Press, 27 июн. 1996 г. - Всего страниц: 256 This book provides a new mathematical theory for the treatment of an ample series of spatial problems of electrodynamics, particle physics, quantum mechanics and elasticity theory. This technique proves to be as powerful for solving the spatial problems of mathematical physics as complex analysis is for solving planar problems. The main analytic tool of the book, a non-harmonic version of hypercomplex analysis recently developed by the authors, is presented in detail. There are given applications of this theory to the boundary value problems of electrodynamics and elasticity theory as well as to the problem of quark confinement. A new approach to the linearization of special classes of the self-duality equation is also considered. Detailed proofs are given throughout. The book contains an extensive bibliography on closely related topics. This book will be of particular interest to academic and professional specialists and students in mathematics and physics who are interested in integral representations for partial differential equations. The book is self-contained and could be used as a main reference for special course seminars on the subject. |
Содержание
Introduction and some remarks on generalizations of complex analy | 1 |
Electrodynamical models | 123 |
Massive spinor fields | 147 |
Hypercomplex factorization systems of nonlinear partial differential | 169 |
Appendices | 191 |
Bibliography | 235 |
Другие издания - Просмотреть все
Integral Representations For Spatial Models of Mathematical Physics Vladislav V Kravchenko,Michael Shapiro Ограниченный просмотр - 2020 |
Integral Representations For Spatial Models of Mathematical Physics Vladislav V Kravchenko,Michael Shapiro Ограниченный просмотр - 1996 |
Integral Representations For Spatial Models of Mathematical Physics Vladislav V Kravchenko,Michael Shapiro Ограниченный просмотр - 2020 |
Часто встречающиеся слова и выражения
a-holomorphic functions algebra analogue arbitrary bicomplex boundary value problems C¹(N Cauchy integral Cauchy integral formula Cauchy kernel Cauchy-Riemann complex analysis complex numbers complex quaternions condition conjugation consider Corollary corresponding Da[f defined definition denote differential equations differential operator Dirac equation Dirichlet problem domain equality equivalent exists F₁ F₂ function f function theory fundamental solution Füter H(C)-valued functions harmonic Helmholtz equation Helmholtz operator Hence Hilbert formulas holomorphic hypercomplex hypercomplex factorization hyperholomorphic functions i₂ imaginary unit integral operators Integral representations invertible Laplace operator Lemma M. V. Shapiro matrix Maxwell equations multiplication obtain one-dimensional complex analysis parameter PROOF properties Proposition purely vectorial quaternionic Cauchy real quaternions rotation Russian satisfies scalar Section singular integral space spinor fields Subsection time-harmonic electromagnetic field transform variables vector zero divisors απ θαρ
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Integral Theorems for Functions and Differential Forms in C(m) Reynaldo Rocha-Chavez,Michael Shapiro,Frank Sommen Недоступно для просмотра - 2001 |
Clifford Algebras and their Applications in Mathematical Physics: Clifford ... Rafał Abłamowicz Ограниченный просмотр - 2000 |