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When is a symmetric pin-jointed framework isostatic?

โœ Scribed by R. Connelly; P.W. Fowler; S.D. Guest; B. Schulze; W.J. Whiteley

Book ID
104018281
Publisher
Elsevier Science
Year
2009
Tongue
English
Weight
292 KB
Volume
46
Category
Article
ISSN
0020-7683

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โœฆ Synopsis

a b s t r a c t Maxwell's rule from 1864 gives a necessary condition for a framework to be isostatic in 2D or in 3D. Given a framework with point group symmetry, group representation theory is exploited to provide further necessary conditions. This paper shows how, for an isostatic framework, these conditions imply very simply stated restrictions on the numbers of those structural components that are unshifted by the symmetry operations of the framework. In particular, it turns out that an isostatic framework in 2D can belong to one of only six point groups. Some conjectures and initial results are presented that would give sufficient conditions (in both 2D and 3D) for a framework that is realized generically for a given symmetry group to be an isostatic framework.

๐Ÿ“œ SIMILAR VOLUMES

When is a symmetric body-bar structure i
When is a symmetric body-bar structure isostatic?
โœ S.D. Guest; B. Schulze; W.J. Whiteley ๐Ÿ“‚ Article ๐Ÿ“… 2010 ๐Ÿ› Elsevier Science ๐ŸŒ English โš– 414 KB

Body-bar frameworks provide a special class of frameworks which are well understood generically, with a full combinatorial theory for rigidity. Given a symmetric body-bar framework, this paper exploits group representation theory to provide necessary conditions for rigidity in the form of very simpl