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An unification of field, lattice and qdeformed soliton systems as integrable evolution equations on regular times scales
http://sms.cam.ac.uk/media/549040
Blazej Szablikowski (Glasgow)
Monday 30 March 2009, 16:1517:00
Geometric Aspects of Discrete and Ultradiscrete Integrable Systems
40
An unification of field, lattice and qdeformed soliton systems as integrable evolution equations on regular times scales
http://sms.cam.ac.uk/media/549040
http://rss.sms.cam.ac.uk/itunesimage/1393653.jpg

An unification of field, lattice and qdeformed soliton systems as integrable evolution equations on regular times scales
ucs_sms_533691_549040
http://sms.cam.ac.uk/media/549040
An unification of field, lattice and qdeformed soliton systems as integrable evolution equations on regular times scales
Blazej Szablikowski (Glasgow)
Monday 30 March 2009, 16:1517:00
Geometric Aspects of Discrete and Ultradiscrete Integrable Systems
Thu, 10 Mar 2011 13:16:32 +0000
Steve Greenham
Bart Vlaar
Blazej Szablikowski
Jonathan Nimmo
Isaac Newton Institute
Szablikowski, B
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Blazej Szablikowski (Glasgow)
Monday 30 March 2009, 16:1517:00
Geometric...
Blazej Szablikowski (Glasgow)
Monday 30 March 2009, 16:1517:00
Geometric Aspects of Discrete and Ultradiscrete Integrable Systems
Cambridge University
2416
http://sms.cam.ac.uk/media/549040
An unification of field, lattice and qdeformed soliton systems as integrable evolution equations on regular times scales
Blazej Szablikowski (Glasgow)
Monday 30 March 2009, 16:1517:00
Geometric Aspects of Discrete and Ultradiscrete Integrable Systems
A seminar from the Geometric Aspects of Discrete and Ultradiscrete Integrable Systems conference in association with the Newton Institute programme: Discrete Integrable Systems
http://www.gla.ac.uk/departments/mathematics/research/isamp/events/gadudis/programme/
An unified theory of the construction of the biHamiltonian nonlinear evolution hierarchies such as field, lattice and qdiscrete soliton hierarchies, will be presented. I will give a brief review of the concept of time scales, including definitions of derivative and integral. A construction of the biHamiltonian structures for integrable systems on regular time scales will be presented. The main result consists on the definition of the trace functional on an algebra of pseudodifferential operators, valid on an arbitrary regular time scale. I will illustrate the theory by differential counterparts of AKNS and KaupBroer hierarchies. The talk will be based on the article: arXiv:0810.0766. (This is joint work with Maciej Blaszak and Burcu Silindir.)
20130227T12:56:46+00:00
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