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ON A FABRIC OF KISSING CIRCLES

Published online by Cambridge University Press:  08 January 2021

VIERA ČERŇANOVÁ*
Affiliation:
Department of Mathematics and Computer Science, Faculty of Education, Trnava University, Priemyselná 4, P.O. Box 9, 918 43Trnava, Slovakia e-mail: [email protected]

Abstract

Applying circle inversion on a square grid filled with circles, we obtain a configuration that we call a fabric of kissing circles. We focus on the curvature inside the individual components of the fabric, which are two orthogonal frames and two orthogonal families of chains. We show that the curvatures of the frame circles form a doubly infinite arithmetic sequence (bi-sequence), whereas the curvatures in each chain are arranged in a quadratic bi-sequence. We also prove a sufficient condition for the fabric to be integral.

Type
Research Article
Copyright
© 2020 Australian Mathematical Publishing Association Inc.

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References

Čerňanová, V., ‘On a configuration resulting from circle inversions’, Proc. 19th Conf. Applied Mathematics APLIMAT 2020 (Curran Associates, Red Hook, NY, 2020), 238243.Google Scholar
Fukagawa, H. and Pedoe, D., Japanese Temple Geometry Problems. San Gaku (The Charles Babbage Research Centre, Winnipeg, Canada, 1989).Google Scholar
Fukagawa, H. and Rothman, T., Sacred Mathematics: Japanese Temple Geometry (Princeton University Press, Princeton, NJ, 2008).Google Scholar
Lagarias, J. C., Mallows, C. L. and Wilks, A. R., ‘Beyond the Descartes circle theorem’, Amer. Math. Monthly 109(4) (2002), 338361.CrossRefGoogle Scholar
Soddy, F., ‘The kiss precise’, Nature 137(3477) (1936), 1021.CrossRefGoogle Scholar
Stephenson, K., ‘Circle packing: a mathematical tale’, Notices Amer. Math. Soc. 50(11) (2003), 13761388.Google Scholar