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Spirit (Hardcover)
James Murdock
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R566
R474
Discovery Miles 4 740
Save R92 (16%)
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This book is about normal forms--the simplest form into which a dynamical system can be put for the purpose of studying its behavior in the neighborhood of a rest point--and about unfoldings--used to study the local bifurcations that the system can exhibit under perturbation. The book presents the advanced theory of normal forms, showing their interaction with representation theory, invariant theory, Groebner basis theory, and structure theory of rings and modules. A complete treatment is given both for the popular "inner product style" of normal forms and the less well known "sl(2) style" due to Cushman and Sanders, as well as the author's own "simplified" style. In addition, this book includes algorithms suitable for use with computer algebra systems for computing normal forms. The interaction between the algebraic structure of normal forms and their geometrical consequences is emphasized. The book contains previously unpublished results in both areas (algebraic and geometrical) and includes suggestions for further research. The book begins with two nonlinear examples--one semisimple, one nilpotent--for which normal forms and unfoldings are computed by a variety of elementary methods. After treating some required topics in linear algebra, more advanced normal form methods are introduced, first in the context of linear normal forms for matrix perturbation theory, and then for nonlinear dynamical systems. Then the emphasis shifts to applications: geometric structures in normal forms, computation of unfoldings, and related topics in bifurcation theory. This book will be useful to researchers and advanced students in dynamical systems, theoretical physics, and engineering.
Perturbation theory and in particular normal form theory has shown
strong growth in recent decades. This book is a drastic revision of
the first edition of the averaging book. The updated chapters
represent new insights in averaging, in particular its relation
with dynamical systems and the theory of normal forms. Also new are
survey appendices on invariant manifolds. One of the most striking
features of the book is the collection of examples, which range
from the very simple to some that are elaborate, realistic, and of
considerable practical importance. Most of them are presented in
careful detail and are illustrated with illuminating diagrams.
An English translation of the Syriac Peshitto Version of the New
Testament. This is the only version of the New Testament written in
an Aramaic dialect akin to the Aramaic spoken by Christ. The
Peshitto dates back to the 5th century, but its roots are much
earlier.
This is the most thorough treatment of normal forms currently
existing in book form. There is a substantial gap between
elementary treatments in textbooks and advanced research papers on
normal forms. This book develops all the necessary theory 'from
scratch' in just the form that is needed for the application to
normal forms, with as little unnecessary terminology as
possible.
Perturbation theory and in particular normal form theory has
shown strong growth in recent decades. This book is a drastic
revision of the first edition of the averaging book. The updated
chapters represent new insights in averaging, in particular its
relation with dynamical systems and the theory of normal forms.
Also new are survey appendices on invariant manifolds. One of the
most striking features of the book is the collection of examples,
which range from the very simple to some that are elaborate,
realistic, and of considerable practical importance. Most of them
are presented in careful detail and are illustrated with
illuminating diagrams.
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