
The book contains the only available complete presentation of the mode-coupling theory (MCT) of complex dynamics of glass-forming liquids, dense polymer melts, and colloidal suspensions. It describes in a self-contained manner the derivation of the MCT equations of motion and explains that the latter define a model for a statistical description of non-linear dynamics. It is shown that the equations of motion exhibit bifurcation singularities, which imply the evolution of dynamical scenarios different from those studied in other non-linear dynamics theories. The essence of the scenarios is explained by the asymptotic solution theory of the equations of motion. The leading-order results deal with scaling laws and the range of validity of these general laws is obtained by the derivation of the leading-correction results. Comparisons of numerical solutions of the MCT equations of motion with the analytic results of the asymptotic analysis demonstrate various facets of the MCT dynamics. Some comparisons of MCT results with data are used to show the relevance of MCT for the discussion of amorphous matter dynamics.
This book investigates the complex dynamics of glass-forming liquids, dense polymer melts, and colloidal suspensions through the framework of mode-coupling theory (MCT). Wolfgang Götze, a prominent researcher in condensed matter physics, provides a comprehensive derivation of MCT equations of motion to model non-linear dynamics in amorphous matter. The text establishes a statistical description of these systems, focusing on how bifurcation singularities dictate unique dynamical scenarios that deviate from standard non-linear theories.
What You Will Find
Scope Limits
Experts recognize this work as the definitive, self-contained reference for the mode-coupling theory of glass-forming liquids. Readers frequently note the high level of academic density and the rigorous mathematical approach required to engage with the material.
Page Count:
656
Publication Date:
2008-01-01
Publisher:
OUP Oxford
ISBN-10:
0191553042
ISBN-13:
9780191553042
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