REFERENCES
- Artmann, Benno “The Cloisters of Hauterive” Math. Intelligencer 13:2 (1991) 44–49.
- Banchoff, T. and Giblin, P. “Global Theorems for Symmetry Sets of Smooth Curves and Polygons in the Plane” Proc. Royal Soc. of Edinburgh 106A (1987) 221–231.
- Banchoff, T. and Giblin, P. “Symmetry Sets of Piecewise Circular Curves” Proc. Royal Soc. of Edinburgh 123A (1993) 1135–1149.
- Besicovitch, A. S. “Variants of a Classical Isoperimetric Problem” Quart. J. Math. (2), 3 (1952) 42–9.
- Bruce, J. W. and Giblin, P. “Growth, Motion and 1-Parameter Families of Symmetry Sets” Proc. Royal Soc. of Edinburgh 104A (1986) 179–204.
- Gaba, M. G. “On a Generalization of the Arbelos” Amer. Math. Monthly 47 (1940) 19–24.
- Giblin, P. and Brassett, A. “Local Symmetry of Plane Curves” Amer. Math. Monthly 92:10 (1985) 689–707.
- Gibson, C. G. and Newstead, P. E. “On the Geometry of the Planar 4-Bar Mechanism” Acta Applicandae Mathematicae 7 (1986) 113–135.
- Hood, Rodney “A Chain of Circles” The Mathematics Teacher (1961) 134–137.
- Marciniak, K. and Putz, B. “Approximation of Spirals by Piecewise Circular Curves of Fewest Circular Arc Segments” Computer Aided Design, Vol. 16, No. 2 (1984) 87–90.
- Martin, R. R. and Nutbourne, A. W. “Differential Geometry Applied to Curve and Surface Design” Vol. 1 (1988) Foundation Ellis Horwood.
- Osserman, R. “The Four-or-More Vertex Theorem” Amer. Math. Monthly 92 (1985) 332–337.
- Rossignac, J. R. and Requicha, A. A. G. Piecewise-Circular Curves for Geometric Modeling, IBM Journal of Research and Development (1987) 296–313.
- Sabin, M. “The Use of Piecewise Forms in the Numerical Representation of Shape” Report no. 60, Computer and Automation Institute, Hungarian Academy of Science, Budapest (1977).