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Invariant measures for the 2D averaged-Euler equations

GFM seminar

Dep. Matemática FCUL, sala 6.2.33

2015-12-16 15:00 .. 16:00

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by Alexandra Symeonides (GFMUL, FCUL)

We define a Gaussian invariant measure for the two-dimensional averaged- Euler equation and show the existence of the solution defined for initial conditions on its support. An invariant surface measure on the level sets of the energy is also constructed, as well as the corresponding flow. Uniqueness holds.

Past conference highlights: Symmetries in Quantum Physics 2017; Advances in Mathematical Fluid Mechanics, Stochastic & Deterministic Methods; Quantum Integrable Systems and Geometry; Chern-Simons Gauge Theory: 20 years after; Second Workshop on Quantum Gravity and Noncommutative Geometry; Infinite Dimensional Algebras and Quantum Integrable Systems II; Stochastic Analysis in Mathematical Physics; Mathematics in Chemistry; Geometric Aspects of Integrable Systems; ICMP 2003