Some Remarks on Periodic Billiard Orbits in Rational Polygons (original) (raw)

1994

Abstract

A billiard ball, i.e. a point mass, moves inside a polygon Q with unit speed along a straight line until it reaches the boundary ∂Q of the polygon, then instantaneously changes direction according to the mirror law: “the angle of incidence is equal to the angle of reflection, ” and continues along the new line

G. Galperin hasn't uploaded this paper.

Let G. know you want this paper to be uploaded.

Ask for this paper to be uploaded.