2021
DOI: 10.1080/00029890.2021.1982360
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New Properties of Triangular Orbits in Elliptic Billiards

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Cited by 22 publications
(33 citation statements)
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“…• Theorem 1: The sum of the cosines of bicentric polygons is invariant over the family. This mirrors an invariant recently proved for elliptic billiard N-periodics [16,10,1,4]. • Theorem 2 The perimeter of pedal polygons of the bicentrics with respect to its limiting points is invariant; see Figure 1.…”
supporting
confidence: 67%
“…• Theorem 1: The sum of the cosines of bicentric polygons is invariant over the family. This mirrors an invariant recently proved for elliptic billiard N-periodics [16,10,1,4]. • Theorem 2 The perimeter of pedal polygons of the bicentrics with respect to its limiting points is invariant; see Figure 1.…”
supporting
confidence: 67%
“…A kinematic analysis of the geometry of 𝑁 =periodics using Jacobian elliptic functions is proposed in [24]. Works [13,19] derive explicit expressions for some invariants in the 𝑁 = 3 case (billiard triangles). Additional constructions derived from N-periodics (e.g., pedals, antipedals, etc.)…”
Section: Related Workmentioning
confidence: 99%
“…are considered in [20], augmenting the list of elliptic billiard invariants to 80. In recent publications [13,19,21] we have described several Euclidean quantities which remain invariant over a given family, some of which have been subsequently proved [2,5,8].…”
Section: Related Workmentioning
confidence: 99%
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