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Autor(en): 
  • Philippe Blanchard
  • Erwin Bruening
  • Mathematical Methods in Physics: Distributions, Hilbert Space Operators, and Variational Methods 
     

    (Buch)
    Dieser Artikel gilt, aufgrund seiner Grösse, beim Versand als 3 Artikel!


    Übersicht

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    Lieferstatus:   i.d.R. innert 14-24 Tagen versandfertig
    Veröffentlichung:  Oktober 2002  
    Genre:  Schulbücher 
     
    Applications of Mathematics / Applied mathematics / astronomy / B / Functional Analysis / Functional analysis and transforms / Mathematical Methods in Physics / Mathematical optimization
    ISBN:  9780817642280 
    EAN-Code: 
    9780817642280 
    Verlag:  Birkhauser Boston Inc 
    Einband:  Gebunden  
    Sprache:  English  
    Serie:  #26 - Progress in Mathematical Physics  
    Dimensionen:  H 235 mm / B 155 mm / D 0 mm 
    Gewicht:  901 gr 
    Seiten:  471 
    Illustration:  XXIII, 471 p. 
    Bewertung: Titel bewerten / Meinung schreiben
    Inhalt:
    Physics has long been regarded as a wellspring of mathematical problems. Mathematical Methods in Physics is a self-contained presentation, driven by historic motivations, excellent examples, detailed proofs, and a focus on those parts of mathematics that are needed in more ambitious courses on quantum mechanics and classical and quantum field theory. A comprehensive bibliography and index round out the work.
    Key Topics: Part I: A brief introduction to (Schwartz) distribution theory; Elements from the theories of ultra distributions and hyperfunctions are given in addition to some deeper results for Schwartz distributions, thus providing a rather comprehensive introduction to the theory of generalized functions. Basic properties of and basic properties for distributions are developed with applications to constant coefficient ODEs and PDEs; the relation between distributions and holomorphic functions is developed as well. * Part II: Fundamental facts about Hilbert spaces and their geometry. The theory of linear (bounded and unbounded) operators is developed, focusing on results needed for the theory of Schr"dinger operators. The spectral theory for self-adjoint operators is given in some detail. * Part III: Treats the direct methods of the calculus of variations and their applications to boundary- and eigenvalue-problems for linear and nonlinear partial differential operators, concludes with a discussion of the Hohenberg--Kohn variational principle. * Appendices: Proofs of more general and deeper results, including completions, metrizable Hausdorff locally convex topological vector spaces, Baire's theorem and its main consequences, bilinear functionals.
    Aimed primarily at a broad community of graduate students in mathematics, mathematical physics, physics and engineering, as well as researchers in these disciplines.

      



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