Outer billiards is a

dynamical system In mathematics, a dynamical system is a system in which a function describes the time dependence of a point in an ambient space. Examples include the mathematical models that describe the swinging of a clock pendulum, the flow of water i ...

based on a

convex Convex or convexity may refer to: Science and technology * Convex lens, in optics Mathematics * Convex set, containing the whole line segment that joins points ** Convex polygon, a polygon which encloses a convex set of points ** Convex polytop ...

shape in the plane. Classically, this system is defined for the

Euclidean plane In mathematics, the Euclidean plane is a Euclidean space of dimension two. That is, a geometric setting in which two real quantities are required to determine the position of each point ( element of the plane), which includes affine notions ...

but one can also consider the system in the

hyperbolic plane In mathematics, hyperbolic geometry (also called Lobachevskian geometry or Bolyai– Lobachevskian geometry) is a non-Euclidean geometry. The parallel postulate of Euclidean geometry is replaced with: :For any given line ''R'' and point ' ...

or in other spaces that suitably generalize the plane. Outer billiards differs from a usual dynamical billiard in that it deals with a discrete sequence of moves ''outside'' the shape rather than inside of it.

Definitions

The outer billiards map

Let P be a

shape in the plane. Given a point x0 outside P, there is typically a unique point x1 (also outside P) so that the line segment connecting x0 to x1 is

tangent In geometry, the tangent line (or simply tangent) to a plane curve at a given point is the straight line that "just touches" the curve at that point. Leibniz defined it as the line through a pair of infinitely close points on the curve. Mo ...

to P at its

midpoint In geometry, the midpoint is the middle point of a line segment. It is equidistant from both endpoints, and it is the centroid both of the segment and of the endpoints. It bisects the segment. Formula The midpoint of a segment in ''n''-dimen ...

and a person walking from x0 to x1 would see P on the right. (See Figure.) The map F: x0 -> x1 is called the ''outer billiards map''. The

inverse Inverse or invert may refer to: Science and mathematics * Inverse (logic), a type of conditional sentence which is an immediate inference made from another conditional sentence * Additive inverse (negation), the inverse of a number that, when a ...

(or backwards) outer billiards map is also defined, as the map x1 -> x0. One gets the inverse map simply by replacing the word ''right'' by the word ''left'' in the definition given above. The figure shows the situation in the

, but the definition in the

is essentially the same.

Orbits

An outer billiards

orbit In celestial mechanics, an orbit is the curved trajectory of an object such as the trajectory of a planet around a star, or of a natural satellite around a planet, or of an artificial satellite around an object or position in space such as ...

is the set of all

iterations Iteration is the repetition of a process in order to generate a (possibly unbounded) sequence of outcomes. Each repetition of the process is a single iteration, and the outcome of each iteration is then the starting point of the next iteration. ...

of the point, namely ... x0 <--> x1 <--> x2 <--> x3 ... That is, start at x0 and iteratively apply both the outer billiards map and the backwards outer billiards map. When P is a strictly convex shape, such as an

ellipse In mathematics, an ellipse is a plane curve surrounding two focal points, such that for all points on the curve, the sum of the two distances to the focal points is a constant. It generalizes a circle, which is the special type of ellipse in ...

, every point in the exterior of P has a well defined orbit. When P is a

polygon In geometry, a polygon () is a plane figure that is described by a finite number of straight line segments connected to form a closed '' polygonal chain'' (or ''polygonal circuit''). The bounded plane region, the bounding circuit, or the two ...

, some points might not have well-defined orbits, on account of the potential ambiguity of choosing the midpoint of the relevant tangent line. Nevertheless, in the polygonal case,

almost every In measure theory (a branch of mathematical analysis), a property holds almost everywhere if, in a technical sense, the set for which the property holds takes up nearly all possibilities. The notion of "almost everywhere" is a companion notion to ...

point has a well-defined orbit. *An orbit is called ''periodic'' if it eventually repeats. *An orbit is called ''aperiodic'' (or ''non-periodic'') if it is not periodic. * An orbit is called ''bounded'' (or ''stable'') if some bounded region in the plane contains the whole orbit. *An orbit is called ''unbounded'' (or ''unstable'') if it is not bounded.

Higher-dimensional spaces

Defining an outer billiards system in a higher-dimensional space is beyond the scope of this article. Unlike the case of ordinary

billiards Cue sports are a wide variety of games of skill played with a cue, which is used to strike billiard balls and thereby cause them to move around a cloth-covered table bounded by elastic bumpers known as . There are three major subdivisions ...

, the definition is not straightforward. One natural setting for the map is a

complex vector space In mathematics and physics, a vector space (also called a linear space) is a set whose elements, often called ''vectors'', may be added together and multiplied ("scaled") by numbers called ''scalars''. Scalars are often real numbers, but can ...

. In this case, there is a natural choice of line tangent to a

body at each point. One obtains these tangents by starting with the normals and using the complex structure to rotate 90 degrees. These distinguished tangent lines can be used to define the outer billiards map roughly as above.

History

Most people attribute the introduction of outer billiards to

Bernhard Neumann Bernhard Hermann Neumann (15 October 1909 – 21 October 2002) was a German-born British-Australian mathematician, who was a leader in the study of group theory. Early life and education After gaining a D.Phil. from Friedrich-Wilhelms Universit ...

in the late 1950s, though it seems that a few people cite an earlier construction in 1945, due to M. Day.

Jürgen Moser Jürgen Kurt Moser (July 4, 1928 – December 17, 1999) was a German-American mathematician, honored for work spanning over four decades, including Hamiltonian dynamical systems and partial differential equations. Life Moser's mother Ilse Strehl ...

popularized the system in the 1970s as a toy model for

celestial mechanics Celestial mechanics is the branch of astronomy that deals with the motions of objects in outer space. Historically, celestial mechanics applies principles of physics (classical mechanics) to astronomical objects, such as stars and planets, ...

. This system has been studied classically in the

, and more recently in the

. One can also consider higher-dimensional spaces, though no serious study has yet been made.

informally posed the question as to whether or not one can have unbounded orbits in an outer billiards system, and Moser put it in writing in 1973. Sometimes this basic question has been called ''the Moser-Neumann question''. This question, originally posed for shapes in the

and solved only recently, has been a guiding problem in the field.

Moser-Neumann question

Bounded orbits in the Euclidean plane

In the 70's,

sketched a proof, based on K.A.M. theory, that outer billiards relative to a 6-times-

differentiable In mathematics, a differentiable function of one real variable is a function whose derivative exists at each point in its domain. In other words, the graph of a differentiable function has a non-vertical tangent line at each interior point in its ...

shape of positive

curvature In mathematics, curvature is any of several strongly related concepts in geometry. Intuitively, the curvature is the amount by which a curve deviates from being a straight line, or a surface deviates from being a plane. For curves, the can ...

has all orbits bounded. In 1982,

Raphael Douady Raphael Douady (born 15 November 1959) is a French mathematician and economist. He holds the Robert Frey Endowed Chair for Quantitative Finance at Stony Brook, New York. He is a fellow of the Centre d’Economie de la Sorbonne (Economic Centre ...

gave the full proof of this result. A big advance in the polygonal case came over a period of several years when three teams of authors, Vivaldi-Shaidenko, Kolodziej, and Gutkin-Simanyi, each using different methods, showed that outer billiards relative to a ''quasirational'' polygon has all orbits bounded. The notion of quasirational is technical (see references) but it includes the class of

regular polygons In Euclidean geometry, a regular polygon is a polygon that is direct equiangular (all angles are equal in measure) and equilateral (all sides have the same length). Regular polygons may be either convex, star or skew. In the limit, a sequence ...

and ''convex rational polygons'', namely those

convex polygon In geometry, a convex polygon is a polygon that is the boundary of a convex set. This means that the line segment between two points of the polygon is contained in the union of the interior and the boundary of the polygon. In particular, it is a ...

s whose vertices have

rational Rationality is the quality of being guided by or based on reasons. In this regard, a person acts rationally if they have a good reason for what they do or a belief is rational if it is based on strong evidence. This quality can apply to an abi ...

coordinates. In the case of rational polygons, all the orbits are periodic. In 1995,

Sergei Tabachnikov Sergei Tabachnikov, also spelled Serge, (in Russian: Сергей Львович Табачников; born in 1956) is a Russian mathematician who works in geometry and dynamical systems. He is currently a Professor of Mathematics at Pennsylvani ...

showed that outer billiards for the

regular pentagon In geometry, a pentagon (from the Greek πέντε ''pente'' meaning ''five'' and γωνία ''gonia'' meaning ''angle'') is any five-sided polygon or 5-gon. The sum of the internal angles in a simple pentagon is 540°. A pentagon may be simpl ...

has some aperiodic orbits, thus clarifying the distinction between the dynamics in the rational and regular cases. In 1996, Philip Boyland showed that outer billiards relative to some shapes can have orbits which accumulate on the shape. In 2005, Daniel Genin showed that all orbits are bounded when the shape is a

trapezoid A quadrilateral with at least one pair of parallel sides is called a trapezoid () in American and Canadian English. In British and other forms of English, it is called a trapezium (). A trapezoid is necessarily a convex quadrilateral in Eu ...

, thus showing that quasirationality is not a ''necessary'' condition for the system to have all orbits bounded. (Not all trapezoids are quasirational.)

Unbounded orbits in the Euclidean plane

In 2007, Richard Schwartz showed that outer billiards has some unbounded orbits when defined relative to the Penrose Kite, thus answering the original Moser-Neumann question in the affirmative. The Penrose kite is the

quadrilateral In geometry a quadrilateral is a four-sided polygon, having four edges (sides) and four corners (vertices). The word is derived from the Latin words ''quadri'', a variant of four, and ''latus'', meaning "side". It is also called a tetragon, ...

from the kites-and-darts Penrose tilings. Subsequently, Schwartz showed that outer billiards has unbounded orbits when defined relative to any irrational kite. An ''irrational kite'' is a

with the following property: One of the

diagonals In geometry, a diagonal is a line segment joining two vertices of a polygon or polyhedron, when those vertices are not on the same edge. Informally, any sloping line is called diagonal. The word ''diagonal'' derives from the ancient Greek δ ...

of the

divides the region into two

triangles A triangle is a polygon with three edges and three vertices. It is one of the basic shapes in geometry. A triangle with vertices ''A'', ''B'', and ''C'' is denoted \triangle ABC. In Euclidean geometry, any three points, when non-collinear ...

of equal area and the other

diagonal In geometry, a diagonal is a line segment joining two vertices of a polygon or polyhedron, when those vertices are not on the same edge. Informally, any sloping line is called diagonal. The word ''diagonal'' derives from the ancient Greek δ� ...

divides the region into two

whose areas are not

multiples of each other. In 2008, Dmitry Dolgopyat and Bassam Fayad showed that outer billiards defined relative to the semidisk has unbounded orbits. The ''semidisk'' is the region one gets by cutting a disk in half. The proof of Dolgopyat-Fayad is robust, and also works for regions obtained by cutting a disk nearly in half, when the word ''nearly'' is suitably interpreted.

Unbounded orbits in the hyperbolic plane

In 2003, Filiz Doǧru and Sergei Tabachnikov showed that all orbits are unbounded for a certain class of

s in the

. The authors call such polygons ''large''. (See the reference for the definition.) Filiz Doǧru and Samuel Otten then extended this work in 2011 by specifying the conditions under which a regular polygonal table in the hyperbolic plane have all orbits unbounded, that is, are large.

Existence of periodic orbits

In ordinary polygonal billiards, the existence of periodic orbits is a major unsolved problem. For instance, it is unknown if every triangular shaped table has a periodic billiard path. More progress has been made for outer billiards, though the situation is far from well understood. As mentioned above, all the orbits are periodic when the system is defined relative to a convex rational polygon in the

. Moreover, it is a recent theorem of Chris Culter (written up by Sergei Tabachnikov) that outer billiards relative to any

has periodic orbits—in fact a periodic orbit outside of any given bounded region.

Open questions

Outer billiards is a subject still in its beginning phase. Most problems are still unsolved. Here are some open problems in the area. *Show that outer billiards relative to

has unbounded orbits. *Show that outer billiards relative to a

regular polygon In Euclidean geometry, a regular polygon is a polygon that is direct equiangular (all angles are equal in measure) and equilateral (all sides have the same length). Regular polygons may be either convex, star or skew. In the limit, a sequence ...

has

orbit periodic. The cases of the equilateral triangle and the square are trivial, and Tabachnikov answered this for the regular pentagon. These are the only cases known. *more broadly, characterize the structure of the set of periodic orbits relative to the typical

. *understand the structure of periodic orbits relative to simple shapes in the hyperbolic plane, such as small equilateral triangles.

References

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