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101 0 $aeng
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181   $ctxt
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200 00$aMathematical analysis of evolution, information, and complexity$b[electronic resource] /$fedited by Wolfgang Arendt and Wolfgang P. Schleich
210   $aWeinheim $cWiley-VCH$dc2009
215   $a1 online resource (504 p.)
300   $aDescription based upon print version of record.
311   $a3-527-40830-4 
320   $aIncludes bibliographical references and index.
327   $aMathematical Analysis of Evolution, Information, and Complexity; Contents; Preface; List of Contributors; Prologue; 1 Weyl's Law; 1.1 Introduction; 1.2 A Brief History of Weyl's Law; 1.2.1 Weyl's Seminal Work in 1911-1915; 1.2.2 The Conjecture of Sommerfeld (1910); 1.2.3 The Conjecture of Lorentz (1910); 1.2.4 Black Body Radiation: From Kirchhoff to Wien's Law; 1.2.5 Black Body Radiation: Rayleigh's Law; 1.2.6 Black Body Radiation: Planck's Law and the Classical Limit; 1.2.7 Black Body Radiation: The Rayleigh-Einstein-Jeans Law; 1.2.8 From Acoustics to Weyl's Law and Kac's Question
327   $a1.3 Weyl's Law with Remainder Term. I1.3.1 The Laplacian on the Flat Torus T(2); 1.3.2 The Classical Circle Problem of Gauss; 1.3.3 The Formula of Hardy-Landau-Voronoi?; 1.3.4 The Trace Formula on the Torus T(2) and the Leading Weyl Term; 1.3.5 Spectral Geometry: Interpretation of the Trace Formula on the Torus T(2) in Terms of Periodic Orbits; 1.3.6 The Trace of the Heat Kernel on d-Dimensional Tori and Weyl's Law; 1.3.7 Going Beyond Weyl's Law: One can Hear the Periodic Orbits of the Geodesic Flow on the Torus T(2); 1.3.8 The Spectral Zeta Function on the Torus T(2)
327   $a1.3.9 An Explicit Formula for the Remainder Term in Weyl's Law on the Torus T(2) and for the Circle Problem1.3.10 The Value Distribution of the Remainder Term in the Circle Problem; 1.3.11 A Conjecture on the Value Distribution of the Remainder Term in Weyl's Law for Integrable and Chaotic Systems; 1.4 Weyl's Law with Remainder Term. II; 1.4.1 The Laplace-Beltrami Operator on d-Dimensional Compact Riemann Manifolds M(d) and the Pre-Trace Formula; 1.4.2 The Sum Rule for the Automorphic Eigenfunctions on M(d); 1.4.3 Weyl's Law on M(d) and its Generalization by Carleman
327   $a1.4.4 The Selberg Trace Formula and Weyl's Law1.4.5 The Trace of the Heat Kernel on M(2); 1.4.6 The Trace of the Resolvent on M(2) and Selberg's Zeta Function; 1.4.7 The Functional Equation for Selberg's Zeta Function Z(s); 1.4.8 An Explicit Formula for the Remainder Term in Weyl's Law on M(2) and the Hilbert-Polya Conjecture on the Riemann Zeros; 1.4.9 The Prime Number Theorem vs. the Prime Geodesic Theorem on M(2); 1.5 Generalizations of Weyl's Law; 1.5.1 Weyl's Law for Robin Boundary Conditions; 1.5.2 Weyl's Law for Unbounded Quantum Billiards; 1.6 A Proof of Weyl's Formula
327   $a1.7 Can One Hear the Shape of a Drum?1.8 Does Diffusion Determine the Domain?; References; 2 Solutions of Systems of Linear Ordinary Differential Equations; 2.1 Introduction; 2.2 The Exponential Ansatz of Magnus; 2.3 The Feynman-Dyson Series, and More General Perturbation Techniques; 2.4 Power Series Methods; 2.4.1 Regular Points; 2.4.2 Singularities of the First Kind; 2.4.3 Singularities of Second Kind; 2.5 Multi-Summability of Formal Power Series; 2.5.1 Asymptotic Power Series Expansions; 2.5.2 Gevrey Asymptotics; 2.5.3 Asymptotic Existence Theorems; 2.5.4 k-Summability
327   $a2.5.5 Multi-Summability
330   $aMathematical Analysis of Evolution, Information, and Complexity deals with the analysis of evolution, information and complexity. The time evolution of systems or processes is a central question in science, this text covers a broad range of problems including diffusion processes, neuronal networks, quantum theory and cosmology. Bringing together a wide collection of research in mathematics, information theory, physics and other scientific and technical areas, this new title offers elementary and thus easily accessible introductions to the various fields of research addressed in the book. 
606   $aMathematical physics
606   $aMathematical analysis
606   $aBoundary value problems$xWeyl theory
608   $aElectronic books.
615  0$aMathematical physics.
615  0$aMathematical analysis.
615  0$aBoundary value problems$xWeyl theory.
676   $a515
676   $a530.15
701   $aArendt$b Wolfgang$f1950-$054059
701   $aSchleich$b Wolfgang$065818
801  0$bMiAaPQ
801  1$bMiAaPQ
801  2$bMiAaPQ
906   $aBOOK
912   $a9910139758203321
996   $aMathematical analysis of evolution, information, and complexity$92295882
997   $aUNINA