# Integrability: Difference between revisions

(D'Hoker and Phong) |
(Intro to Quantum Integrability) |
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===reviews=== | ===reviews=== | ||

[http://arxiv.org/abs/0912.3350 Introduction to Quantum Integrability]<br> | |||

by Anastasia Doikou, Stefano Evangelisti, Giovanni Feverati, Nikos Karaiskos (0912.3350 [math-ph], 56 pages) | |||

[http://arxiv.org/abs/0911.5257 Gauge theories, Simple Groups and Integrable Systems]<br> | [http://arxiv.org/abs/0911.5257 Gauge theories, Simple Groups and Integrable Systems]<br> | ||

by M.A.Olshanetsky (0911.5257 [hep-th], 31 pages) | by M.A.Olshanetsky (0911.5257 [hep-th], 31 pages) |

## Latest revision as of 12:59, 21 December 2009

see also Spin chains and integrability in the AdS/CFT correspondence, Mathematics

### reviews

Introduction to Quantum Integrability

by Anastasia Doikou, Stefano Evangelisti, Giovanni Feverati, Nikos Karaiskos (0912.3350 [math-ph], 56 pages)

Gauge theories, Simple Groups and Integrable Systems

by M.A.Olshanetsky (0911.5257 [hep-th], 31 pages)

Three lectures on classical integrable systems and gauge field theories

by M.Olshanetsky (0802.3857 [hep-th], 36 pages)

Introduction to Yangian Symmetry in Integrable Field Theory

by N. MacKay (hep-th/0409183, 36 pages)

Lectures on Integrable Hierarchies and Vertex Operators

by A.A. Vladimirov (hep-th/0402097, 28 pages)

Lectures on Supersymmetric Yang-Mills Theory and Integrable Systems

by Eric D'Hoker, D. H. Phong (hep-th/9912271, 124 pages, 1 figure)

Intersection Theory, Integrable Hierarchies and Topological Field Theory

by R. Dijkgraaf (hep-th/9201003, 73 pages)