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Publication details

Document type
Journal articles

Document subtype
Full paper

Title
Stochastic stability of invariant measures: The 2D Euler equation

Participants in the publication
F. Cipriano (Author)
H. Ouerdiane (Author)
R. Vilela Mendes (Author)
FACULDADE DE CIÊNCIAS DA UNIVERSIDADE DE LISBOA
CMAFcIO

Summary
Infi nite-dimensional dissipative dynamical systems, stochastic stability provides the se-\nlection of the physically relevant measures. That this might also apply to systems defined\nby partial differential equations, both dissipative and conservative, is the inspiration for\nthis work. As an example, the 2D Euler equation is studied. Among other results this\nstudy suggests that the coherent structures observed in 2D hydrodynamics are associated\nwith con gurations that maximize stochastically stable measures uniquely determined\nby the boundary conditions in dynamical space.

Date of Publication
2019-07-10

Where published
International Journal of Modern Physics B

Publication Identifiers
ISSN - 0217-9792,1793-6578

Publisher
World Scientific Pub Co Pte Lt

Volume
33
Number
17

Starting page
1950185

Document Identifiers
DOI - https://doi.org/10.1142/s0217979219501856
URL - http://dx.doi.org/10.1142/s0217979219501856


Export

APA
F. Cipriano, H. Ouerdiane, R. Vilela Mendes, (2019). Stochastic stability of invariant measures: The 2D Euler equation. International Journal of Modern Physics B, 33, ISSN 0217-9792,1793-6578. eISSN . http://dx.doi.org/10.1142/s0217979219501856

IEEE
F. Cipriano, H. Ouerdiane, R. Vilela Mendes, "Stochastic stability of invariant measures: The 2D Euler equation" in International Journal of Modern Physics B, vol. 33, 2019. 10.1142/s0217979219501856

BIBTEX
@article{46389, author = {F. Cipriano and H. Ouerdiane and R. Vilela Mendes}, title = {Stochastic stability of invariant measures: The 2D Euler equation}, journal = {International Journal of Modern Physics B}, year = 2019, volume = 33 }