Ronaldo García scite author profile

Can any secrets still be shed by that much studied, uniquely integrable, Elliptic Billiard? Starting by examining the family of 3-periodic trajectories and the loci of their Triangular Centers, one obtains a beautiful and variegated gallery of curves: ellipses, quartics, sextics, circles, and even a stationary point. Secondly, one notices this family conserves an intriguing ratio: Inradius-to-Circumradius. In turn this implies three conservation corollaries: (i) the sum of bounce angle cosines, (ii) the product of excentral cosines, and (iii) the ratio of excentral-to-orbit areas. Monge's Orthoptic Circle's close relation to 4-periodic Billiard trajectories is wellknown. Its geometry provided clues with which to generalize 3-periodic invariants to trajectories of an arbitrary number of edges. This was quite unexpected. Indeed, the Elliptic Billiard did surprise us!

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Elliptic Billiards and Ellipses Associated to the 3-Periodic Orbits

García

2019

The American Mathematical Monthly

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Structural Stability of Asymptotic Lines on Surfaces Immersed in R3

García¹,

Gutiérrez²,

Sotomayor³

1999

Bulletin des Sciences Mathématiques

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Inflection points and topology of surfaces in 4-space

García¹,

Mochida²,

Fuster³

et al. 2000

Trans. Amer. Math. Soc.

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Abstract. We consider asymptotic line fields on generic surfaces in 4-space and show that they are globally defined on locally convex surfaces, and their singularities are the inflection points of the surface. As a consequence of the generalized Poincaré-Hopf formula, we obtain some relations between the number of inflection points in a generic surface and its Euler number. In particular, it follows that any 2-sphere, generically embedded as a locally convex surface in 4-space, has at least 4 inflection points.

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New Properties of Triangular Orbits in Elliptic Billiards

García

Reznik²,

Koiller

2021

The American Mathematical Monthly

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Ronaldo García

Can the Elliptic Billiard Still Surprise Us?

Elliptic Billiards and Ellipses Associated to the 3-Periodic Orbits

Structural Stability of Asymptotic Lines on Surfaces Immersed in R3

Inflection points and topology of surfaces in 4-space

New Properties of Triangular Orbits in Elliptic Billiards

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