<--- Back to Details
First PageDocument Content
Knot theory / Quantum field theory / Polynomials / Differential geometry / Homology theory / Chern–Simons theory / Chern–Simons form / Gauge theory / Jones polynomial / Physics / Topology / Mathematics
Date: 2009-08-18 07:00:27
Knot theory
Quantum field theory
Polynomials
Differential geometry
Homology theory
Chern–Simons theory
Chern–Simons form
Gauge theory
Jones polynomial
Physics
Topology
Mathematics

Communications in Commun. Math. Phys. 121,[removed])

Add to Reading List

Source URL: www.maths.ed.ac.uk

Download Document from Source Website

File Size: 3,74 MB

Share Document on Facebook

Similar Documents

Topology / Differential topology / Theoretical physics / Symplectic topology / Homology theory / Morse theory / Contact geometry / Quantum field theory / ChernSimons theory / Floer homology / Relative contact homology

Proc. Int. Cong. of Math. – 2018 Rio de Janeiro, Vol–1084) KNOT CONTACT HOMOLOGY AND OPEN GROMOV–WITTEN THEORY Tobias Ekholm

DocID: 1xTnD - View Document

Homology and Cohomology Theory 14Fxx [1] Timothy G. Abbott, Kiran S. Kedlaya, and David Roe, Bounding Picard numbers of surfaces using p-adic cohomology, Martin Bright, Brauer groups of diagonal quartic surface

DocID: 1voPE - View Document

MODULE AND FILTERED KNOT HOMOLOGY THEORIES JEFF HICKS Abstract. We provide a new way to define Bar-Natan’s F2 [u] knot homology theory. The u torsion of BN •,• is shown to explicitly give Turner’s spectral sequen

DocID: 1tmp7 - View Document

The Jones Polynomial And Khovanov Homology From Gauge Theory Edward Witten, IAS Lecture at SCGP, June 1, 2015

DocID: 1sWV3 - View Document

THE HOPF RING FOR P (n) DOUGLAS C. RAVENEL AND W. STEPHEN WILSON Abstract. We show that E∗ (P (n) ), the E-homology of the Ω-spectrum for ∗ P (n), is an E∗ free Hopf ring for E a complex oriented theory with In s

DocID: 1rV8C - View Document