Seminar talk, 2 April 2008: Difference between revisions
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After a short introduction/description of equation structure and <math>\ell</math>- and <math>\ell^*</math>-covering, we describe as a quite complicated application: Monge-Ampère equation. Results for Hamiltonian, symplectic and recursion structures are obtained in a "standard" and "straight-forward" way, demonstrating the intrinsic power of the geometrical picture. | After a short introduction/description of equation structure and <math>\ell</math>- and <math>\ell^*</math>-covering, we describe as a quite complicated application: Monge-Ampère equation. Results for Hamiltonian, symplectic and recursion structures are obtained in a "standard" and "straight-forward" way, demonstrating the intrinsic power of the geometrical picture. | ||
[[Category: Seminar|Seminar talk | [[Category: Seminar|Seminar talk 7991-95-97]] | ||
[[Category: Seminar abstracts|Seminar talk | [[Category: Seminar abstracts|Seminar talk 7991-95-97]] | ||
Latest revision as of 22:06, 17 September 2009
Speaker: Paul Kersten
Title: The Monge-Ampère equation: Hamiltonian and symplectic structures, recursions
Abstract:
After a short introduction/description of equation structure and - and -covering, we describe as a quite complicated application: Monge-Ampère equation. Results for Hamiltonian, symplectic and recursion structures are obtained in a "standard" and "straight-forward" way, demonstrating the intrinsic power of the geometrical picture.
