Low-Dimensional Topology and Number Theory. 23 Aug - 29 Aug ID: Organizers Paul E. Gunnells, Amherst Thang Le, Atlanta Adam S. Sikora, New York Don B. Zagier, Bonn/Trieste. Organizer Login Participant Login. Lookup workshop in oberwolfach photo collection. Navigation. What is a good reference for starting low-dimensional topology? Stack Exchange Network Stack Exchange network consists of Q&A communities including Stack Overflow, the largest, most trusted online community for developers to learn, share their knowledge, and build their careers. Thank you for your interest in our Low Dimensional Topology Workshop. I hope you will consider attending other workshops here in the near future. In recent years, there has been lots of exciting progress in many branches of low-dimensional topology, including Heegard Floer and Khovanov Homology, small 4-Manifolds, TQFT, knot concordance and. Low dimensional topology and number theory XII March 23 - 26, AiRIMaQ Seminar Room, Innovation Plaza, Momochihama, Fukuoka, JAPAN Program To be announced Titles and Abstracts Jesus A. Alvarez L opez (University of Santiago de Compostela) joint with Yuri Kordyukov and Eric Leichtnam Deninger’s problem about a trace formula for foliations.

Selected Applications of Geometry to Low-Dimensional Topology About this Title. Michael H. Freedman, University of California, San Diego, La Jolla, CA and Feng Luo, Rutgers University, New Brunswick, New Brunswick, NJ. Publication: University Lecture Series Publication Year Volume 1 ISBNs: (print); (online)Cited by: The American Mathematical Society recently published Braid Foliations in Low-Dimensional Topology, co-authored by UB Mathematics Professor William W. Menasco, and Western Illinois University Professor Douglas J. book is a self-contained introduction to braid foliation techniques, which is a theory developed to study knots, links and surfaces in general 3 . Low-dimensional Topology. Graphs on Surfaces: Dualities, Polynomials, and Knots. Book Review. Morse Theory and Floer Homology. Book Review. Explorations in Topology: Map Coloring, Surfaces and Knots. Low Dimensional Geometry: From Euclidean Surfaces to Hyperbolic Knots. Book Review. The intent is to describe the very strong connection between geometry and low- dimensional topology in a way which will be useful and accessible (with some eﬀort) to graduate students and mathematicians working in related ﬁelds, particularly 3-File Size: 4MB.

$\begingroup$ I second the suggestion to focus on low-dimensional topology. Some particularly fun parts of low-dimensional topology for a first course are: classification of surfaces (including Part 1 of Conway et al "Symmetry of Things"); some baby knot theory (Reidemeister moves, quandle invariants like the number of three-colorings of the. With the approach of an explicit computational point of view on knot invariants, this user-friendly volume will benefit readers to easily understand low-dimensional topology from examples and computations, rather than only knowing terminologies and theorems. Sample Chapter(s) Chapter 1: Basic Knots, Links and their Equivalences ( KB) Contents. There are a number of blogs about low-dimensional topology and geometric group theory. Low Dimensional Topology maintained by Nathan Dunfield, Jesse Johnson, Daniel Moskovich, Henry Wilton and perhaps others. Here there be dragons. The Berstein Seminar Blog maintained by Tim Riley. Sketches of Topology maintained by Kenneth Baker. Beautiful stuff. Download the eBook Floer Homology, Gauge Theory, and Low Dimensional Topology: Proceedings of the Clay Mathematics Institute Summer School, Alfred Renyi Institute of Mathematics, Budapest, Hungary, June , (Clay Mathematics Proceedings, Vol. 5) in PDF or EPUB format and read it directly on your mobile phone, computer or any device.