gts2012.tem.uoc.gr
GTS 2012
http://gts2012.tem.uoc.gr/invitedspeakers.html
Minisymposium on Publicly Available. June 17th and 19th, 2012, Chapel Hill, NC, USA. Book of Abstracts (3.2MB). Minisymposium Program (in PDF). University of Queensland, Australia. He will give a talk about the software Regina. TU Darmstadt, Germany. He will give a talk about the software polymake. Lawrence Berkeley National Lab, United States. He will give a talk about the software Dionysus. University of Crete & FO.R.T.H. He will give a talk about triangulations and Voronoi diagrams in CGAL.
appliedtopology.wordpress.com
Dual Simplicial Complexes | Applied Algebraic Topology
https://appliedtopology.wordpress.com/2013/09/11/dual-simplicial-complexes
September 11, 2013. In the process of designing homework problems for Applied Algebraic Topology (ESE 680-003) last night, I stumbled upon a most beautiful application of the nerve theorem as well as a construction of a dual simplicial complex that is defined for any (locally finite) simplicial complex. This dual complex has the property that it is always homotopic to the original simplicial complex. Be a simplicial complex with vertex set. Is defined to be the set of simplices. To be the set of faces of.
appliedtopology.wordpress.com
Learning AAT | Applied Algebraic Topology
https://appliedtopology.wordpress.com/learning-aat
There is a separate blog. Concerned with learning applied algebraic topology from the ground up. It is inspired by an on-going course that is being co-taught by myself (Justin Curry) and Robert Ghrist (my PhD advisor). Leave a Reply Cancel reply. Enter your comment here. Fill in your details below or click an icon to log in:. Address never made public). You are commenting using your WordPress.com account. ( Log Out. You are commenting using your Twitter account. ( Log Out. Speeding up Homology….
appliedtopology.wordpress.com
welcome | Applied Algebraic Topology
https://appliedtopology.wordpress.com/2013/09/09/welcome
September 9, 2013. This site is just getting underway. Stay tuned…. Dual Simplicial Complexes →. Leave a Reply Cancel reply. Enter your comment here. Fill in your details below or click an icon to log in:. Address never made public). You are commenting using your WordPress.com account. ( Log Out. You are commenting using your Twitter account. ( Log Out. You are commenting using your Facebook account. ( Log Out. You are commenting using your Google account. ( Log Out. Notify me of new comments via email.
appliedtopology.wordpress.com
September | 2013 | Applied Algebraic Topology
https://appliedtopology.wordpress.com/2013/09
Monthly Archives: September 2013. September 12, 2013. Speeding up Homology via Duality? In the last post. I constructed for any (locally finite) simplicial complex. A dual complex. Today, I thought of using this to gain a potential speed-up in computational homology. Note that simplicial homology of. Is the same as Cech homology of the cover given by open stars of the vertices of. This is because the nerve of this cover is precisely. However, we know that the dual complex has the same homotopy type as.
appliedtopology.wordpress.com
About | Applied Algebraic Topology
https://appliedtopology.wordpress.com/about
My name is Justin Curry and I am a PhD student at the University of Pennsylvania working with Robert Ghrist. My goal in this blog is to bring the latest developments in topological methods in applied mathematics to a wider audience. There should be something of interest here to mathematicians, computer scientists and engineers. Leave a Reply Cancel reply. Enter your comment here. Fill in your details below or click an icon to log in:. Address never made public). Notify me of new comments via email.
appliedtopology.wordpress.com
Dual Simplicial Complexes | Applied Algebraic Topology
https://appliedtopology.wordpress.com/2013/09/11/dual-simplicial-complexes/comment-page-1
September 11, 2013. In the process of designing homework problems for Applied Algebraic Topology (ESE 680-003) last night, I stumbled upon a most beautiful application of the nerve theorem as well as a construction of a dual simplicial complex that is defined for any (locally finite) simplicial complex. This dual complex has the property that it is always homotopic to the original simplicial complex. Be a simplicial complex with vertex set. Is defined to be the set of simplices. To be the set of faces of.
theory.stanford.edu
Stanford CS Theory
http://theory.stanford.edu/main/people.shtml
John C. Mitchell. Virginia V. Williams. Donald E. Knuth. Jeffrey D. Ullman. Post-Docs and Visiting/Associate Researchers. Nikolaj S. Bjørner. Andrew V. Goldberg. David R. Karger. Andrew P. Kosoresow. Jeffrey D. Oldham. Tomás E. Uribe.
paulbendich.com
Paul Bendich
http://www.paulbendich.com/publications.html
Phone: 1 919 660 2811. Email: lastname@math.duke.edu. Topological and Statistical Behavior Classifiers for Tracking Applications. Paul Bendich, Sang Chin. Jesse Clarke, Jonathan DeSena, John Harer. David Porter, David Rouse, Nate Strawn, and Adam Watkins. To appear in IEEE Trans. on Aerospace and Electronic Systems. Persistent Homology Analysis of Brain Artery Trees. Paul Bendich, J.S.Marron. Alex Pielcoh, and Sean Skwerer. To appear in the Annals of Applied Statistics. Christopher J. Tralie. Proc 24th S...
