TY - JOUR
T1 - Gutkin billiard tables in higher dimensions and rigidity
AU - Bialy, Misha
N1 - Publisher Copyright:
© 2018 IOP Publishing Ltd & London Mathematical Society.
PY - 2018/4/10
Y1 - 2018/4/10
N2 - Gutkin found a remarkable class of convex billiard tables in a plane that has a constant angle invariant curve. In this paper we prove that in dimension 3 only a round sphere has such a property. For dimensions greater than 3, a hypersurface with a Gutkin property different from a round sphere, if it exists, must be of constant width and, moreover, it must have very special geometric properties. In the 2D case we prove a rigidity result for Gutkin billiard tables. This is done with the help of a new generating function introduced recently for billiards in our joint paper with Mironov. In the present paper a formula for the generating function in higher dimensions is found.
AB - Gutkin found a remarkable class of convex billiard tables in a plane that has a constant angle invariant curve. In this paper we prove that in dimension 3 only a round sphere has such a property. For dimensions greater than 3, a hypersurface with a Gutkin property different from a round sphere, if it exists, must be of constant width and, moreover, it must have very special geometric properties. In the 2D case we prove a rigidity result for Gutkin billiard tables. This is done with the help of a new generating function introduced recently for billiards in our joint paper with Mironov. In the present paper a formula for the generating function in higher dimensions is found.
KW - Birkhoff billiards
KW - bodies of constant width
KW - geodesics
UR - http://www.scopus.com/inward/record.url?scp=85045695115&partnerID=8YFLogxK
U2 - 10.1088/1361-6544/aaaf4d
DO - 10.1088/1361-6544/aaaf4d
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AN - SCOPUS:85045695115
SN - 0951-7715
VL - 31
SP - 2281
EP - 2293
JO - Nonlinearity
JF - Nonlinearity
IS - 5
ER -