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Reference

Ricardo Zalaya and Javier Barallo: Mathematical Sculpture Classification. In: Bridges 2003. Pages 53–60

DOI

Abstract

The introduction of mathematical sculpture in advanced education needs a taxonomy to classify all the different types of sculpture. From our point of view, this classification has never been arranged deeply. This paper is a first attempt to that classification. We expect to receive suggestions from the Art and Mathematics community in order to start a work that we will take away during the next two years.and whose first step is given with this paper. As a preliminary starting point we have suggested the following nine categories for mathematical sculpture:

I. Polyhedral and classic geometry,

II. Non-oriented surfaces,

IIi. Topological knots,

IV. Quadrics and ruled surfaces,

V. Symmetric and modular structures,

VI. Boolean operations,

VII. Minimal surfaces,

Vlli. Transformations IX. Others.

Extended Abstract

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Full Text

http://archive.bridgesmathart.org/2003/bridges2003-53.pdf

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http://archive.bridgesmathart.org/2003/bridges2003-53.html