The Sierpinski curve viewed by numerical computations with infinities and infinitesimals
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摘要
The Sierpinski curve is one of the most known space-filling curves and one with the highest number of applications. We present a recently proposed computational methodology based on the infinite quantity called grossone to investigate the behavior of two different constructions of the Sierpinski curve. We emphasize that, adopting this point of view, we have infinitely many Sierpinski curves depending, contrarily to traditional analysis, on each specific starting configuration. Of particular interest are some power series expansions in the new infinitesimal quantities emerging from the study of the considered curves.
论文关键词:Sierpinski curve,Space-filling curves,Fractals,Fractal geometry,Numerical infinities and infinitesimals,Grossone
论文评审过程:Received 19 February 2017, Revised 30 May 2017, Accepted 24 June 2017, Available online 14 July 2017, Version of Record 18 October 2017.
论文官网地址:https://doi.org/10.1016/j.amc.2017.06.024