Bahrdt, Daniel; Seybold, Martin P. Rational points on the unit sphere. Approximation complexity and practical constructions. (English) Zbl 1457.65012 Burr, Michael (ed.), Proceedings of the 42nd international symposium on symbolic and algebraic computation, ISSAC 2017, Kaiserslautern, Germany, July 25–28, 2017. New York, NY: Association for Computing Machinery (ACM). 29-36 (2017). Cited in 1 Document MSC: 65D18 Numerical aspects of computer graphics, image analysis, and computational geometry 11J99 Diophantine approximation, transcendental number theory Keywords:Diophantine approximation; perturbation; rational points; stable geometric constructions; unit sphere Software:gmp; MPFR; CGAL; STRIPACK; libratss; OpenStreetMap; libdts2 PDFBibTeX XMLCite \textit{D. Bahrdt} and \textit{M. P. Seybold}, in: Proceedings of the 42nd international symposium on symbolic and algebraic computation, ISSAC 2017, Kaiserslautern, Germany, July 25--28, 2017. New York, NY: Association for Computing Machinery (ACM). 29--36 (2017; Zbl 1457.65012) Full Text: DOI arXiv