Apollonian sets in taxicab geometry

Aaron Fish; Anna Miller; Dylan Helliwell; Eric Bahuaud; Freddy Nungaray; Julian Tiffay; Nico Velez; Shana Crawford; Suki Shergill

arxiv: 1809.07487 · v1 · pith:IJJLYIUEnew · submitted 2018-09-20 · 🧮 math.MG

Apollonian sets in taxicab geometry

Eric Bahuaud , Shana Crawford , Aaron Fish , Dylan Helliwell , Anna Miller , Freddy Nungaray , Suki Shergill , Julian Tiffay

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Nico Velez

This is my paper

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keywords apolloniansetstaxicabgeometrypointsanalogousapolloniuscharacterized

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Fix two points $p$ and $q$ in the plane and a positive number $k \neq 1$. A result credited to Apollonius of Perga states that the set of points $x$ that satisfy $d(x, p)/d(x, q) = k$ forms a circle. In this paper we study the analogous set in taxicab geometry. We find that while Apollonian sets are not taxicab circles, more complicated Apollonian sets can be characterized in terms of simpler ones.

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Apollonian sets in taxicab geometry

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