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Abstract: trands. 3 Two simple cases are presented in Figure 1, where the arrows indicate how to manipulate the strands to transform the left-hand braid into the right-hand braid and vice versa. 1 This section is based on [KV]. 2 Like for knots, we will concentrate on a two-dimensional representation for threedimensional braids [Art47]. 3 Such braids are said to be isotopic [Art47]. ß ß Figure 1: Transformaties op vlechten Exercise 1 Execute the transformations in Figure 1 on real strands (e.g. ... (Update)
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BibTeX entry: (Update)
@misc{ oostrom-course,
author = "V. van Oostrom",
title = "Course notes on Braids",
url = "citeseer.ist.psu.edu/138093.html" }
Citations (may not include all citations):174 Combinatory Reduction Systems (context) - Klop - 1980
102 Computations in orthogonal rewriting systems (context) - Huet, L'evy - 1991
65 volume 103 of Studies in Logic and the Foundations of Mathem.. (context) - Barendregt, Calculus et al. - 1984
57 Confluence for Abstract and Higher-Order Rewriting (context) - van Oostrom - 1994
51 Theoretical Computer Science (context) - van Oostrom - 1997
41 The braid group and other groups (context) - Garside - 1969
38 Parallel reductions in -calculus (context) - Takahashi - 1995
23 Relations and Graphs - Discrete Mathematics for Computer Sci.. (context) - Schmidt, Strohlein - 1991
22 Higher-order families - van Oostrom - 1996
21 Residual theory in -calculus: a formal development (context) - Huet - 1994
15 Theorie der Zopfe (context) - Artin - 1926
14 Equational reasoning with 2-dimensional diagrams - Lafont - 1992
13 ese de doctorat d (context) - L'evy, et et al. - 1978
9 Finite family developments - van Oostrom - 1997
7 Penrose diagrams and 2-dimensional rewriting (context) - Lafont - 1992
[Article contains additional citations not shown here]
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