Computational form-finding of tension membrane structures - Non-finite element approaches: Part 2. Triangular mesh discretization and control of mesh distortion in modelling minimal surface membranes
UNSPECIFIED. (2003) Computational form-finding of tension membrane structures - Non-finite element approaches: Part 2. Triangular mesh discretization and control of mesh distortion in modelling minimal surface membranes. INTERNATIONAL JOURNAL FOR NUMERICAL METHODS IN ENGINEERING, 56 (5). pp. 669-684. ISSN 0029-5981Full text not available from this repository.
Official URL: http://dx.doi.org/10.1002/nme.580
This paper, presented in three parts, discusses a computational methodology for form-finding of tension membrane structures (TMS), or fabric structures, used as roofing forms. The term `form-finding' describes a process of finding the shape of a TMS under its initial tension. Such a shape is neither known a priori, nor can it be described by a simple mathematical function. The work is motivated by the need to provide an efficient numerical tool, which will allow a better integration of the design/analysis/manufacture of TMS. A particular category of structural forms is considered, known as minimal surface membranes (such as can be reproduced by soap films). The numerical method adopted throughout is dynamic relaxation (DR) with kinetic damping. Part 1 gave a background to the problem of TMS design, described the DR method, and presented a new form-finding methodology, based on the Laplace-Young equation and cubic spline fitting to give a full, piecewise, analytical description of the surface. Part 2 describes an alternative and novel form-finding method, based on a constant tension field and faceted (triangular mesh) representation of the minimal surface. Techniques for controlling mesh distortion are presented, and their effects on the accuracy and computational efficiency of the solution, as well as on the subsequent stages in design, are examined. Part 3 gives a comparison of the performance of the initial method (Part 1) and the faceted approximations (Part 2). Functional relations, which encapsulate the numerical efficiency of each method, are presented. Copyright (C) 2002 John Wiley Sons, Ltd.
|Item Type:||Journal Article|
|Subjects:||T Technology > TA Engineering (General). Civil engineering (General)
Q Science > QA Mathematics
|Journal or Publication Title:||INTERNATIONAL JOURNAL FOR NUMERICAL METHODS IN ENGINEERING|
|Publisher:||JOHN WILEY & SONS LTD|
|Date:||7 February 2003|
|Number of Pages:||16|
|Page Range:||pp. 669-684|
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