- The conformal boundary and the boundary of the convex core
- MODULI SPACES OF HYPERBOLIC 3-MANIFOLDS AND DYNAMICS ON CHARACTER VARIETIES
- Hausdorff dimension and limits of Kleinian groups Richard D. Canary \Lambda and Edward C. Taylor
- Cores of hyperbolic 3manifolds and limits of Kleinian groups II James W. Anderson and Richard D. Canary \Lambda
- The visual core of a hyperbolic 3manifold James W. Anderson and Richard D. Canary \Lambda
- MARDEN'S TAMENESS CONJECTURE: HISTORY AND APPLICATIONS
- THE CURIOUS MODULI SPACES OF UNMARKED KLEINIAN SURFACE GROUPS
- AMBIENT QUASICONFORMAL HOMOGENEITY OF PLANAR DOMAINS
- Ubiquity of geometric finiteness in boundaries of deformation spaces of hyperbolic 3manifolds
- On the topology of deformation spaces of Kleinian James W. Anderson, Richard D. Canary \Lambda , and Darryl McCullough
- SPECTRAL THEORY, HAUSDORFF DIMENSION AND THE TOPOLOGY OF HYPERBOLIC 3MANIFOLDS
- MODULI SPACES OF HYPERBOLIC 3-MANIFOLDS AND DYNAMICS ON CHARACTER VARIETIES
- THE THURSTON METRIC ON HYPERBOLIC DOMAINS AND BOUNDARIES OF CONVEX HULLS
- EXOTIC QUASICONFORMALLY HOMOGENEOUS PETRA BONFERT-TAYLOR, RICHARD D. CANARY, JUAN SOUTO,
- INTRODUCTORY BUMPONOMICS: THE TOPOLOGY OF DEFORMATION SPACES OF HYPERBOLIC
- QUASICONFORMAL HOMOGENEITY OF HYPERBOLIC SURFACES WITH FIXED-POINT FULL AUTOMORPHISMS
- A new foreword for Notes on Notes of Thurston Richard D. Canary
- QUASICONFORMAL HOMOGENEITY OF HYPERBOLIC MANIFOLDS
- Homotopy Equivalences of 3-Manifolds Deformation Theory of Kleinian Groups
- THE THURSTON METRIC ON HYPERBOLIC DOMAINS AND BOUNDARIES OF CONVEX HULLS
- Pushing the boundary Richard D. Canary
- Bounding the bending of a hyperbolic 3manifold Martin Bridgeman and Richard D. Canary \Lambda
- From the boundary of the convex core to the conformal boundary
- Approximation by maximal cusps in boundaries of deformation spaces of Kleinian groups
- Math 490 Handout: September 8, 2011 Definition: If (X, d) is a metric space, > 0 and x0 X, then the open ball of radius
- Math 490 Handout: Tuesday September 6, 2011 Definition: A metric on a set X is a function
- Math 490, Fall 2011 Introduction to Topology
- Math 490 Handout: Thursday September 22, 2011 Definition: If x is a point in a metric space X, we say that U is an open neighborhood of
- Math 490 Handout: Thursday October 6, 2011 Definition: A topology on a set X is a collection T of subsets of X with the following
- Math 490 Handout: Thursday November 17, 2011 Definition: Let (X, T ) be a topological space. A collection {U} of open subsets of X
- Math 490 Extra Handout on Complete Metric Spaces Definition: A metric space (X, d) is said to be complete if every Cauchy sequence in X
- Math 490 Handout: Thursday December 1, 2011 In-class Exercises
- Math 490 Handout: Thursday November 10, 2010 In-class Exercises
- Math 490 Handout: Tuesday November 8, 2011 Definition: A topological space (X, T ) is disconnected if there exist disjoint non-empty
- Math 490 Handout: Tuesday September 27, 2010 Recall that if {xn}
- Math 490 Handout: Tuesday November 22, 2011 Definition: Let (X, T ) be a topological space. A subset A of X is said to be compact if it
- Math 490 Handout: Tuesday September 20, 2011 Fact: If f : X Y is a function between metric spaces which is continuous at a point
- Math 490 Handout: Tuesday December 6, 2011 In-class Exercises
- Math 490 Handout: Thursday November 3, 2011 In-class Exercises
- Math 490 Handout: Thursday October 13, 2011 Definition: If (X, TX) and (Y, TY ) are topological spaces then we say that W TXY if for
- Math 490 Handout: September 13, 2011 Definitions: A function f : (X1, d1) (X2, d2) is continuous at x X1 if for all > 0
- Math 490 Extra Handout on the product topology and the box topology on infinite products
- Math 490 Handout: Thursday October 27, 2011 Definition: If (X, T ) is a topological space and A X, then the subspace topology on
- Math 490 Handout: Tuesday October 4, 2011 Suppose that (X, dX) and (Y, dY ) are metric spaces, we define
- Math 490 Handout: Thursday September 29, 2011 On Tuesday, we used the following basic fact, whose proof is worth recording.
- Team Homework Guidelines Each week, you will work with a team of two or three other students to produce written
- Math 490 Handout: Thursday October 20, 2011 Last Thursday's In-class Exercises
- DYNAMICS ON PSL(2, C)-CHARACTER VARIETIES: 3-MANIFOLDS WITH TOROIDAL BOUNDARY COMPONENTS
- Math 490 Handout: Thursday September 15, 2011 Definition: A sequence {xn} of points in a metric space (X, d) is said to converge to
- Math 490 Handout: Tuesday October 11, 2011 Definition: A function f : (X1, T1) (X2, T2) between topological spaces is continuous
- Math 490 Handout: Tuesday November 1, 2011 Definition: Suppose that {xn} is a sequence of points in a topological space (X, T ). We
- Math 490 Handout: Tuesday November 29, 2011 We will begin class with presentations of the following in-class exercises from last Tuesday
- Math 490 Extra Handout on quotient maps and the quotient topology Definition: Let (X, TX) and (Y, TY ) be topological spaces. A continuous, onto map q : X Y
