Classical and Quantum Models and Arithmetic Problems Lecture Notes in Pure and Applied Mathematics Series
Auteur : Chudnovsky David
Here is an unsurpassed resource-important accounts of a variety of dynamic systems topics related to number theory. Twelve distinguished mathematicians present a rare complete analyticsolution of a geodesic quantum problem on a negatively curved surface...and explicit determination of modular function growth near a real point applications of number theory to dynamical systems and applications of mathematical physics to number theory...tributes to the often-unheralded pioneers in the field... an examination of completely integrableand exactly solvable physical models .. . and much more!
Classical and Quantum Models and Arithmetic Problems is certainly a major source of information, advancing the studies of number theorists, algebraists, and mathematical physicistsinterested in complex mathematical properties of quantum field theory, statistical mechanics,and dynamic systems. Moreover, the volume is a superior source of supplementary readingfor graduate-level courses in dynamic systems and application of number theory.
Date de parution : 09-2017
17.8x25.4 cm
Disponible chez l'éditeur (délai d'approvisionnement : 14 jours).
Prix indicatif 220,72 €
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Mots-clés :
Continued Fraction Expansion; continued; Fuchsian Group; fraction; Quadratic Irrational; expansion; Geodesic Flow; differential; Riemann Surface; equations; Constant Negative Curvature; geodesic; Fundamental Domain; flow; Continued Fraction; fuchsian; Matrix Recurrences; group; Linear Fractional Transformation; riemann; Non-linear Differential Equations; M.F; Barnsley; Periodic Orbits; J.S; Geronimo; Inverse Scattering Method; A.N; Harrington; Linear Recurrence; Harvey Cohn; Automorphic Function; David V; Chudnovsky; Non-linear Differential; Gregory V; Chudnovsky; Nonlinear Differential Equations; Churchill Richard C; Binary Sequences; Lee David; Jacobi Elliptic Functions; Martin C; GutzwiHer; Rational Integers; Asmus L; Schmidt; Contiguous Relations; Sheingorn Mark; Hyperbolic Line; Michael Tabor; Eisenstein Series; Inverse Scattering Transform Method; Stability Exponent