Periodic Billiards Within Conics in the Minkowski Plane and Akhiezer Polynomials


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We derive necessary and sufficient conditions for periodic and for elliptic periodic trajectories of billiards within an ellipse in the Minkowski plane in terms of an underlining elliptic curve. We provide several examples of periodic and elliptic periodic trajectories with small periods. We observe a relationship between Cayley-type conditions and discriminantly separable and factorizable polynomials. Equivalent conditions for periodicity and elliptic periodicity are derived in terms of polynomial-functional equations as well. The corresponding polynomials are related to the classical extremal polynomials. In particular, the light-like periodic trajectories are related to the classical Chebyshev polynomials. Similarities and differences with respect to the previously studied Euclidean case are highlighted.

Sobre autores

Anani Adabrah

Department of Mathematical Sciences

Autor responsável pela correspondência
Email: ananikomla.adabrah@utdallas.edu
Estados Unidos da América, 800 West Campbell Road, Richardson, TX, 75080

Vladimir Dragović

Department of Mathematical Sciences; Mathematical Institute SANU

Autor responsável pela correspondência
Email: vladimir.dragovic@utdallas.edu
Estados Unidos da América, 800 West Campbell Road, Richardson, TX, 75080; Kneza Mihaila 36, Beograd, p.p. 367, 11001

Milena Radnović

Mathematical Institute SANU; School of Mathematics and Statistics

Autor responsável pela correspondência
Email: milena.radnovic@sydney.edu.au
Sérvia, Kneza Mihaila 36, Beograd, p.p. 367, 11001; Carslaw F07, Sydney, NSW, 2006

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