Geometric symmetry (book)

Geometric symmetry
	Cover page of the first edition
Author	E.H. Lockwood and R.H. Macmillan
Country	United Kingdom
Language	English
Subject	Geometry, symmetry
Publisher	Cambridge University Press
Publication date	1978
Media type	Print
Pages	228
ISBN	978-0-521-21685-2
Dewey Decimal	516.1
LC Class	QA447.L63
Text	Geometric symmetry at Internet Archive

Geometric symmetry is a book by mathematician E.H. Lockwood and design engineer R.H. Macmillan published by Cambridge University Press in 1978. The subject matter of the book is symmetry and geometry.

Structure and topics[edit]

The book is divided into two parts. The first part (chapters 1-13) is largely descriptive and written for the non-mathematical reader. The second part (chapters 14-27) is more mathematical, but only elementary geometrical knowledge is assumed.

In the first part the authors describe and illustrate the following topics: symmetry elements, frieze patterns, wallpaper patterns, and rod, layer and space patterns. The first part also introduces the concepts of continuous, dilation, dichromatic and polychromatic symmetry.

In the second part the authors revisit all of the topics from the first part; but in more detail, and with greater mathematical rigour. Group theory and symmetry are the foundations of the material in the second part of the book. A detailed analysis of the subject matter is given in the appendix below.

The book is printed in two colours, red and black, to facilitate the identification of colour symmetry in patterns.

Audience[edit]

In the preface the authors state: "In this book we attempt to provide a fairly comprehensive account of symmetry in a form acceptable to readers without much mathematical knowledge [...] The treatment is geometrical which should appeal to art students and to readers whose mathematical interests are that way inclined." However, Joseph H. Gehringer in a review in The Mathematics Teacher commented "Clearly not intended as a popular treatment of symmetry, the style of the authors is both concise and technical [...] this volume will appeal primarily to those devoting special attention to this field,"^[1]

Reception[edit]

The reception of the book was mixed.

William J. Firey in his review for zbMATH Open praised the book for its "beautiful and appropriate figures" but criticised "a certain imprecision about such fundamental notions as pattern, ornament, crystal."^[2]
H.S.M. Coxeter in Mathematical Reviews also praised "this beautifully illustrated book", but took issue with the authors' artificially restricted approach to colour symmetry, describing it as "unfortunate" in comparison to that of A.V. Shubnikov and V.A. Koptsik in Symmetry in Science and Art, and C.H. MacGillavry's analysis of M.C. Escher's work in Symmetry aspects of M. C. Escher's periodic drawings.^[3]
H. Martyn Cundy in The Mathematical Gazette wrote positively about the book: "It assumes little beyond the most elementary knowledge, develops the mathematics it needs as it goes along [...] and conveys the reader on a fascinating journey from the human face to polychromatic symmetry groups in three dimensions." and concluded by saying "Altogether this is a wholly delightful volume, obviously destined to be a classic work of reference which every school and college library will need and want to have, and to be treasured as a thing of beauty and a possession for ever by all lovers of geometry. However, Cundy also had some criticisms of the selection of material, and of the use of some non-standard terminology.^[4]
In 1987, Branko Grünbaum and Geoffrey Colin Shephard writing in Tilings and patterns criticised the authors and their Russian predecessor N.V. Belov by saying that it is "clear that the groups of colour symmetries of chromatic plane patterns were not in the authors' minds."^[5]

Editions[edit]

First hardback edition published by Cambridge University Press in 1978^[6]
Reprint edition published by Cambridge University Press in 2008^[7]

Appendix: Subject coverage[edit]

Geometric symmetry subject coverage

Subject coverage
#	Chapter	Topics
1	Reflexions and rotations	Reflection, rotation, central inversion
2	Finite patterns in the plane	Cyclic symmetry, dihedral symmetry
3	Frieze patterns	Motif, frieze pattern, frieze group, glide reflection, translation
4	Wallpaper patterns	Wallpaper pattern, net
5	Finite objects in three dimensions	Rotary inversion, polyhedra, crystallographic point symmetry
6	Rod patterns	Rod pattern, helix, screw motion, enantiomorphic
7	Layer patterns	Layer pattern
8	Space patterns	Lattice, triclinic, monoclinic, orthorhombic, tetragonal, hexagonal, rhombohedral, cubic, Bravais lattice
9	Patterns allowing continuous movement	Continuous movement, continuous symmetry of a circle, continuous symmetry of a sphere
10	Dilation symmetry	Dilation symmetry, On Growth and Form
11	Colour symmetry	Dichromatic symmetry, polychromatic symmetry, M. C. Escher
12	Classify and identifying plane patterns	Cell, pattern analysis
13	Making patterns	Tessellation, regular and semi-regular tessellations, Schläfli symbol
14	Movements in the plane	Isometry, symmetry movement, symmetry element, direct and opposite isometries, transform of a movement
15	Symmetry groups. Point groups	Point group, point groups in two dimensions, point groups in three dimensions, crystallographic restriction theorem, Abelian group
16	Line groups in two dimensions	Line group, translational symmetry
17	Nets	Net
18	Plane groups in two dimensions	Plane group
19	Movements in three dimensions	Rotation in three dimensions, screw rotation
20	Point groups in three dimensions	Point groups in three dimensions
21	Line groups in three dimensions	Line groups in three dimensions
22	Plane groups in three dimensions	Layer group
23	Lattices	Lattice, Bravais lattice
24	Space groups I	Diad and tetrad rotations
25	Space groups II	Triad and hexad rotations, list of space groups
26	Limiting groups	Limiting groups
27	Colour symmetry	Dichromatic symmetry, polychromatic symmetry, antisymmetry

References[edit]

^ Gehringer, Joseph H. (1979). "Review". The Mathematics Teacher. 72 (6): 472. JSTOR 27961735.
^ Firey, W.J. (1978). "Review of Geometric symmetry". zbMATH Open. FIZ Karlsruhe. Zbl 0389.51008. Retrieved 11 March 2024.
^ Coxeter, H.S.M. (1978). "Review of Geometric symmetry". MathSciNet. American Mathematical Society. MR 0514015.
^ Cundy, H. Martyn (1979). "Review". The Mathematical Gazette. 63 (425): 212–214. doi:10.2307/3617910.
^ Grünbaum, Branko; Shephard, Geoffrey Colin (1987). Tilings and patterns. p. 466. ISBN 978-0-716-71193-3. OCLC 13092426.
^ Lockwood, E.H.; Macmillan, R.H. (1978). Geometric symmetry. Cambridge University Press. p. 228. ISBN 978-0-521-21685-2.
^ Lockwood, E.H.; Macmillan, R.H. (2008). Geometric symmetry. Cambridge University Press. p. 228. ISBN 978-0-521-09301-9.

External links[edit]

"Geometric symmetry". at the Internet Archive

[Gehringer-1] Gehringer, Joseph H. (1979). "Review". The Mathematics Teacher. 72 (6): 472. JSTOR 27961735.

[Firey-2] Firey, W.J. (1978). "Review of Geometric symmetry". zbMATH Open. FIZ Karlsruhe. Zbl 0389.51008. Retrieved 11 March 2024.

[Coxeter-3] Coxeter, H.S.M. (1978). "Review of Geometric symmetry". MathSciNet. American Mathematical Society. MR 0514015.

[Cundy-4] Cundy, H. Martyn (1979). "Review". The Mathematical Gazette. 63 (425): 212–214. doi:10.2307/3617910.

[Grünbaum-5] Grünbaum, Branko; Shephard, Geoffrey Colin (1987). Tilings and patterns. p. 466. ISBN 978-0-716-71193-3. OCLC 13092426.

[6] Lockwood, E.H.; Macmillan, R.H. (1978). Geometric symmetry. Cambridge University Press. p. 228. ISBN 978-0-521-21685-2.

[7] Lockwood, E.H.; Macmillan, R.H. (2008). Geometric symmetry. Cambridge University Press. p. 228. ISBN 978-0-521-09301-9.

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