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Contents: R.L. Moss, G.M. Diffee, M.L. Greaser: Contractile
Properties of Skeletal Muscle Fibers in Relation to Myofibrillar
Protein Isoforms.- J.E. Wilson: Hexokinases.- J. Rassow, N.
Pfanner: Molecular Chaperones and Intracellular Protein
Translocation.- H. Fuder, E. Muscholl: Heteroreceptor-Mediated
Modulation of Noradrenaline and Acetylcholine Release from
Peripheral Nerves.
This scarce antiquarian book is a selection from Kessinger
Publishing's Legacy Reprint Series. Due to its age, it may contain
imperfections such as marks, notations, marginalia and flawed
pages. Because we believe this work is culturally important, we
have made it available as part of our commitment to protecting,
preserving, and promoting the world's literature. Kessinger
Publishing is the place to find hundreds of thousands of rare and
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This is a reproduction of a book published before 1923. This book
may have occasional imperfections such as missing or blurred pages,
poor pictures, errant marks, etc. that were either part of the
original artifact, or were introduced by the scanning process. We
believe this work is culturally important, and despite the
imperfections, have elected to bring it back into print as part of
our continuing commitment to the preservation of printed works
worldwide. We appreciate your understanding of the imperfections in
the preservation process, and hope you enjoy this valuable book.
An Introduction to the Theory of Numbers by G. H. Hardy and E. M.
Wright is found on the reading list of virtually all elementary
number theory courses and is widely regarded as the primary and
classic text in elementary number theory. Developed under the
guidance of D. R. Heath-Brown, this Sixth Edition of An
Introduction to the Theory of Numbers has been extensively revised
and updated to guide today's students through the key milestones
and developments in number theory.
Updates include a chapter by J. H. Silverman on one of the most
important developments in number theory - modular elliptic curves
and their role in the proof of Fermat's Last Theorem -- a foreword
by A. Wiles, and comprehensively updated end-of-chapter notes
detailing the key developments in number theory. Suggestions for
further reading are also included for the more avid reader.
The text retains the style and clarity of previous editions making
it highly suitable for undergraduates in mathematics from the first
year upwards as well as an essential reference for all number
theorists.
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