Next: About this document Up: Billiards that share a Previous: Reply to the editor

References

1: M. Bialy. Convex billiards and a theorem of E.Hopf. Math. Z., 214:147-154, 1993.
2: G.D. Birkhoff. On the periodic motions of dynamical systems. Acta Math., 50:359-379, 1950.
3: P. Boyland and G.R. Hall. Invariant circles and the order structure of periodic orbits in monotone twist maps. Topology, 26:21-35, 1987.
4: R. Douady. Regular dependence of invariant curves and Aubry-Mather sets of twist maps of an annulus. Ergod. Th. Dyn. Sys., 8:555-584, 1988.
5: B.A. Dubrovin, A.T.Fomenko, and S.P.Novikov. Modern Geometry-Methods and Applications Part II. Graduate Texts in Mathematics. Springer Verlag, New York, 1985.
6: P.M. Gruber. Convex billiards. Geometriae Dedicata, 33:205-226, 1990.
7: P.M. Gruber. Baire categories in convexity. In Handbook of convex geometry. Elsevier Science Publishers, 1993.
8: E. Gutkin. Billiard tables of constant width and dynamical characterizations of the circle. 1993. Proceedings of the Penn. State Workshop.
9: E. Gutkin and A. Katok. Caustics for inner and outer billiards. Commun. Math. Phys., 173:101-133, 1995.
10: E. Gutkin and O. Knill. Billiards that share a common convex caustic. Preprint, 1996.
11: G. R. Hall. A topological version of a theorem of mather on twist maps. Ergod. Th. Dyn. Sys., 4:585-603, 1984.
12: M. Herman. Sur la conjugaison différentiable des difféomorphismes du cercle à des rotations. Pub. I.H.E.S., 49:5-233, 1979.
13: A. Hubacher. Instability of the boundary in the billiard ball problem. Commun. Math. Phys., 108:483-488, 1987.
14: N. Innami. Convex curves whose points are vertices of billiard triangles. Kodai Math. J., 11:17-24, 1988.
15: A. Katok. Some remarks on Birkhoff and Mather twist map theorems. Ergod. Th. Dyn. Sys., 2:185-194, 1982.
16: A. Katok and B. Hasselblatt. Introduction to the modern theory of dynamical systems, volume 54 of Encyclopedia of Mathematics and its applications. Cambridge University Press, 1995.
17: V.F. Lazutkin. The existence of caustics for a billiard problem in a convex domain. Math. Izvestija, 7:185-214, 1973.
18: W.D. Neuman M. Brown. Proof of the Poincaré-Birkhoff fixed point theorem. Mich. Math. J., 24:21-31, 1975.
19: J. Mather. Glancing billiards. Ergod. Th. Dyn. Sys., 2:397-403, 1982.
20: J. Mather. Letter to R.MacKay, 1984.
21: J. Mather. Variational construction of orbits of twist diffeomorphisms. Journal of the AMS, 4:207-263, 1991.
22: K. Meyer. Generic bifurcation of periodic orbits. Trans. Am. Math. Soc., 149:95-107, 1970.
23: J. Milnor. Topology from the differentiable viewpoint. University Press of Virginia, Charlottesville, 1965.
24: J.C. Oxtoby. Measure and Category. Springer Verlag, New York, 1971.
25: S. Pelikan and E. Slaminka. A bound for the fixed point index of area-preserving homeomorphisms of two manifolds. Ergod. Th. Dyn. Sys., 7:463-479, 1987.
26: H. Poritsky. The billiard ball problem on a table with a convex boundary-an illustrative dynamical problem. Annals of Mathematics, 51:456-470, 1950.
27: C.C. Pugh. A generalized Poincaré index formula. Topology, 7:217-226, 1968.
28: C.P. Simon. A bound for the fixed-point index of an area-preserving map with applications to mechanics. Inv. Math., 26:187-200, 1974.
29: Ya.G. Sinai. Introduction to ergodic theory. Princeton University press, Princeton, 1976.
30: E. Slaminka. Removing index 0 fixed points for area preserving maps of two-manifolds. Trans. Am. Math. Soc., 340:429-445, 1993.
31: S. Tabachnikov. Billiards. Panoramas et synthèses. Société Mathématique de France, 1995.
32: D.V. Treshchev V.V. Kozlov. Billiards, volume 89 of Translations of mathematical monographs. AMS, 1991.
33: D. Ornstein Y. Katznelson. A new method for twist theorems. JdAM, 60:157-208, 1993.

Oliver Knill
Wed Jul 8 11:57:32 CDT 1998