Can the Elliptic Billiard Still Surprise Us?

Reznik, Dan; García, Ronaldo; Koiller, Jair

doi:10.1007/s00283-019-09951-2

Cited by 41 publications

(64 citation statements)

References 15 publications

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“…Properties of 3-periodics in the confocal pair (elliptic billiard) were studied in [11,18]. A few results and their subsequent proofs include the following: the elliptic locus of the incenter [7,19], circumcenter [6,7], invariant sum of cosines [1,2], and invariant ratio of outer-to-orbit polygon areas [3].…”

Section: Related Workmentioning

confidence: 99%

“…The power of the center wrt the circumcircle (dashed red) and Euler's circle (dashed green) is invariant. live is that the sum of angle cosines is invariant [11,18]. The Mittenpunkt X 9 is stationary at O [18].…”

Section: Confocal Pairmentioning

confidence: 99%

“…live is that the sum of angle cosines is invariant [11,18]. The Mittenpunkt X 9 is stationary at O [18]. The semi-axes of the inner ellipse are given by [7]:…”

Section: Confocal Pairmentioning

confidence: 99%

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Invariant Center Power and Elliptic Loci of Poncelet Triangles

et al. 2021

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We study center power with respect to circles derived from Poncelet 3-periodics (triangles) in a generic pair of ellipses as well as loci of their triangle centers. We show that (i) for any concentric pair, the power of the center with respect to either circumcircle or Euler's circle is invariant, and (ii) if a triangle center of a 3-periodic in a generic nested pair is a fixed linear combination of barycenter and circumcenter, its locus over the family is an ellipse.

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Section: Related Workmentioning

confidence: 99%

Section: Confocal Pairmentioning

confidence: 99%

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Invariant Center Power and Elliptic Loci of Poncelet Triangles

et al. 2021

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“…Computer animations of billiards in ellipses, which were carried out by Reznik [24], stimulated a new vivid interest on this well studied topic, where algebraic and analytic methods are meeting (see, e.g., [2,3,11,[21][22][23] and many further 0123456789(). : V,-vol references in [24]).…”

Section: Introductionmentioning

confidence: 99%

The geometry of billiards in ellipses and their poncelet grids

Stachel

2021

J. Geom.

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The goal of this paper is an analysis of the geometry of billiards in ellipses, based on properties of confocal central conics. The extended sides of the billiards meet at points which are located on confocal ellipses and hyperbolas. They define the associated Poncelet grid. If a billiard is periodic then it closes for any choice of the initial vertex on the ellipse. This gives rise to a continuous variation of billiards which is called billiard motion though it is neither a Euclidean nor a projective motion. The extension of this motion to the associated Poncelet grid leads to new insights and invariants.

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“…Classic invariants include Joachmisthal's constant J (all trajectory segments are tangent to a confocal caustic) and perimeter L [26]. A few properties detected experimentally [21] and later proved can be divided into two groups: (i) loci of triangle centers (we use the X k notation in [17]), and (ii) invariants. In terms of loci, the following results have been proved: (i) the locus of the incenter [9,23], barycenter [25], circumcenter [7,9], orthocenter [11] and many others are ellipses; (ii) a special triangle center known as the Mittenpunkt X 9 is stationary [24].…”

Section: Introductionmentioning

confidence: 99%

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García

Reznik²

2021

Kog (Online)

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We compare loci types and invariants across Poncelet families interscribed in three distinct concentric Ellipse pairs: (i) ellipse-incircle, (ii) circumcircle-inellipse, and (iii) homothetic. Their metric properties are mostly identical to those of 3 well-studied families: elliptic billiard (confocal pair), Chapple's poristic triangles, and the Brocard porism. We therefore organized them in three related groups.

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Can the Elliptic Billiard Still Surprise Us?

Cited by 41 publications

References 15 publications

Invariant Center Power and Elliptic Loci of Poncelet Triangles

Invariant Center Power and Elliptic Loci of Poncelet Triangles

The geometry of billiards in ellipses and their poncelet grids

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