Geometry of crystallographic groups

Andrzej Szczepański

Crystallographic groups are groups which act in a nice way and via isometries on some n-dimensional Euclidean space. They got their name, because in three dimensions they occur as the symmetry groups of a crystal (which we imagine to extend to infinity in all directions). The book is divided into two parts. In the first part, the basic theory of crystallographic groups is developed from the very beginning, while in the second part, more advanced and more recent topics are discussed. So the first part of the book should be usable as a textbook, while the second part is more interesting to researchers in the field. There are short introductions to the theme before every chapter. At the end of a book is a list of conjectures and open problems. Moreover there are three appendices. The last one gives an example of the torsion free crystallographic group with a trivial center and a trivial outer automorphism group. This volume omits topics about generalization of crystallographic groups to nilpotent or solvable world and classical crystallography. We want to emphasize that most theorems and facts presented in the second part are from the last two decades. This is after the book of L Charlap "Bieberbach groups and flat manifolds" was published.

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この本の情報

書名 Geometry of crystallographic groups
著作者等 Szczepanski Andrzej
Szczepański Andrzej
シリーズ名 Algebra and discrete mathematics
出版元 World Scientific
刊行年月 c2012
ページ数 xi, 195 p.
大きさ 24 cm
ISBN 9789814412254
NCID BB10325818
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言語 英語
出版国 アメリカ合衆国
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