Seminar talk, 12 November 2025: Difference between revisions
No edit summary |
No edit summary |
||
| Line 3: | Line 3: | ||
| title = Invariant reduction for PDEs. III: Poisson brackets | | title = Invariant reduction for PDEs. III: Poisson brackets | ||
| abstract = I will show that, under suitable conditions, finite-dimensional systems describing invariant solutions of PDEs inherit local Hamiltonian operators through the mechanism of invariant reduction, which applies uniformly to point, contact, and higher symmetries. The inherited operators endow the reduced systems with Poisson bivectors that relate constants of invariant motion to symmetries. The induced Poisson brackets agree with those of the original systems, up to sign. At the core of this construction lies the interpretation of Hamiltonian operators as degree-2 conservation laws of degree-shifted cotangent equations. | | abstract = I will show that, under suitable conditions, finite-dimensional systems describing invariant solutions of PDEs inherit local Hamiltonian operators through the mechanism of invariant reduction, which applies uniformly to point, contact, and higher symmetries. The inherited operators endow the reduced systems with Poisson bivectors that relate constants of invariant motion to symmetries. The induced Poisson brackets agree with those of the original systems, up to sign. At the core of this construction lies the interpretation of Hamiltonian operators as degree-2 conservation laws of degree-shifted cotangent equations. | ||
| video = | | video = https://video.gdeq.org/GDEq-zoom-seminar-20251112-Konstantin_Druzhkov.mp4 | ||
| slides = [[Media:Inv_red_III.pdf|Inv_red_III.pdf]] | | slides = [[Media:Inv_red_III.pdf|Inv_red_III.pdf]] | ||
| references = {{arXiv|2507.08213}} | | references = {{arXiv|2507.08213}} | ||
| 79YY-MM-DD = 7974-88-87 | | 79YY-MM-DD = 7974-88-87 | ||
}} | }} | ||
Latest revision as of 23:18, 12 November 2025
Speaker: Konstantin Druzhkov
Title: Invariant reduction for PDEs. III: Poisson brackets
Abstract:
I will show that, under suitable conditions, finite-dimensional systems describing invariant solutions of PDEs inherit local Hamiltonian operators through the mechanism of invariant reduction, which applies uniformly to point, contact, and higher symmetries. The inherited operators endow the reduced systems with Poisson bivectors that relate constants of invariant motion to symmetries. The induced Poisson brackets agree with those of the original systems, up to sign. At the core of this construction lies the interpretation of Hamiltonian operators as degree-2 conservation laws of degree-shifted cotangent equations.
Video
Slides: Inv_red_III.pdf
References:
arXiv:2507.08213