Seminar talk, 4 March 2020: Difference between revisions
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| title = Action-Angle Duality for a Poisson-Lie Deformation of the Trigonometric <math>\mathrm{BC}_n</math> Sutherland System | | title = Action-Angle Duality for a Poisson-Lie Deformation of the Trigonometric <math>\mathrm{BC}_n</math> Sutherland System | ||
| abstract = The property of action-angle duality was first brought to light in a systematic way by Ruijsenaars. The method of Hamiltonian reduction reveals a natural mechanism for how such a phenomenon can arise. I will give a general overview of this and present as a special case the new result, obtained together with László Fehér, referred to in the title. | | abstract = The property of action-angle duality was first brought to light in a systematic way by Ruijsenaars. The method of Hamiltonian reduction reveals a natural mechanism for how such a phenomenon can arise. I will give a general overview of this and present as a special case the new result, obtained together with László Fehér, referred to in the title. | ||
Language: English | |||
| video = | | video = | ||
| slides = | | slides = | ||
Latest revision as of 10:38, 25 February 2020
Speaker: Ian Marshall
Title: Action-Angle Duality for a Poisson-Lie Deformation of the Trigonometric Sutherland System
Abstract:
The property of action-angle duality was first brought to light in a systematic way by Ruijsenaars. The method of Hamiltonian reduction reveals a natural mechanism for how such a phenomenon can arise. I will give a general overview of this and present as a special case the new result, obtained together with László Fehér, referred to in the title.
Language: English