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Fractal Dust and n Schottky Dancing University of Utah GSAC Colloquium 10.10.06. Josh Thompson. Geometric patterns have played many roles in history:. Science Art Religious The symmetry we see is a result of underlying mathematical structure. Symmetry.
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Fractal Dust andnSchottky DancingUniversity of Utah GSAC Colloquium 10.10.06 Josh Thompson
Geometric patterns have played many roles in history: • Science • Art • Religious • The symmetry we see is a result of underlying mathematical structure
Symmetry • Translation symmetry: invariance under a shift by some fixed length in a given direction. • Rotational symmetry: invariance under a rotation about some point. • Reflectionsymmetry: (mirror symmetry) invariance under flipping about a line • Glide Reflection: translation composed with a reflection through the line of translation. Rigid Motions: transformations of the plane which preserve (Euclidean) distance.
How to Distinguish Transformations( look for what's left unchanged ) • Translation – one point at infinity is fixed • Rotation – one point (the center) in the interior fixed • Reflection – a line of fixed points (lines perpendicular to the reflecting line are invariant) • Glide Reflection – a line is invariant, no finite points fixed Note: The last two reverse orientation.
Rigid Motions of the Plane • Have form T(z) = az + b with a,b real, z complex • Collection of transformations which preserve a pattern forms a group under composition. • For example, the wallpaper shown before has a nice symmetry group:
They all have a certain algebraic form and the law of composition is equivalent to matrix multiplication. Mobius transformations can be thought of in many ways, one being the transformations that map {lines,circles} to {lines,circles} Mobius Transformations ( angle preserving maps )
Mobius transformations are 'chaotic' or discrete A Kleinian group is a discrete group of Mobius transformations. Kleinian Groups
(Distinguished by the nature of the fixed points) Parabolic Only one fixed point. All circles through that fixed point and tangent to a specific direction are invariant. Conjugate to translation f(z) = z+1 Hyperbolic Two fixed points, one attracting one repelling. Conjugate to multiplication (expansion) f(z) = az, with |a| > 1. Elliptic Two fixed points, both neutral. Conjugate to a rotation. Three types of Mobius Tranformations
Conjugate by a Mobius transformation so that one of the tangent points goes to infinity. The circles tangent there are mapped to parallel lines. The other three tangent points all lie on a straight line by Euclidean geometry, which goes through infinity the fourth tangent point. The four tangent points lie on a circle.
Given one Mobius transformation that takes C1 to C4, (and C2 to C3) there is a unique second Mobius transformation taking C1 to C2, (and C3 to C4) and the two transformations commute. Extend the Circle Chain
Allowing two Mobius transformations a(z), b(z) to interact can produce many Klienian groups. In general, the group G = <a(z),b(z)> generated by aand b is likely to be freely generated – no relations in the group give the identity. Letting Two Mobius Transformations Play
Since the determinants are taken to be 1, two transformations are specified by 6 complex parameters. (Three in each matrix.) After conjugation we only need 3 complex numbers to specify the two matices. A common choice of the three parameters is tr a, tr b, tr ab. Another choice for the third parameter is tr of the commutator. There Are Many Examples
One way to visualize the geometry of the group is to plot a tiling, consists of taking a seed tile and plotting all the images under the elements of the group. This is the essence of a wallpaper pattern. Kleinian group tilings exhibit a new level of complexity over Euclidean wallpaper patterns. Euclidean tilings have one limit point. Kleinian tilings have infinitely many limit points, all arranged in a fractal. Geometry of the Group
Two generators a(z) and b(z)pair four circles as follows: a(outside of C1) = inside of C2 b(outside of C3) = inside of C4 This is known as a classical Schottky group. The tile we plot is the “Swiss cheese” common outside of all four circles. Example of a Kleinian Group
The limit set consists of all the points inside infintely nested sequences of circles. It is a Cantor set or fractal dust. The outside of all four circles is a fundamental (seed) tile for this tiling. The group identifies the edges of the tile to create a surface of genus two. The Limit Set
Jos Leys of Belgium has made an exhaustive study of Kleinian tilinigs and limit sets at this website: And for the fanatics, there is even fractal jewelry to be had. Kleinian Groups Artists
Next we look at one specific group that has a construction that demonstrates many aspects of the mathematics. Consider the following arrangement of circles. Double Cusp Group
The complement of the circle web consists of four white regions a,A,b,B. These now play the role of Schottky disks. This group is a deformation of a Schottky group – now a set curves on the surface are pinched. Deformation of Schottky Group
(Most) Images by David Wright Resource Text: Indra's Pearls (Mumford, Series, Wright) Acknowledgments