TY  - BOOK
AU  - Guo,Boling
AU  - Huang,Daiwen
TI  - Infinite-dimensional dynamical systems in atmospheric and oceanic science
SN  - 9789814590389
AV  - QC880.4.A8 G86 2014eb
U1  - 551.4601/185 23
PY  - 2014///
CY  - New Jersey
PB  - World Scientific
KW  - Atmospheric circulation
KW  - Dynamic meteorology
KW  - Marine sciences
KW  - Circulation atmosphérique
KW  - Météorologie dynamique
KW  - Sciences de la mer
KW  - SCIENCE
KW  - Earth Sciences
KW  - Geography
KW  - bisacsh
KW  - Geology
KW  - fast
KW  - Electronic books
N1  - Translated from Chinese; Includes bibliographical references; 1. Nonlinear equations of the atmospheric and the oceanic motions. 1.1. Basic equations of the atmospheric and the oceanic motions. 1.2. Equations of the atmosphere and the oceans in the sphere coordinate frame. 1.3. Equations of the atmosphere in atmospheric pressure coordinate frame. 1.4. Equations of the atmosphere in the topography coordinate frame. 1.5. Equations of the atmosphere and the oceans in local rectangular coordinate frame under [beta symbol]-plane approximation. 1.6. Equations of the atmosphere and the oceans under satification approximation. 1.7. Boundary conditions -- 2. Some quasi-geostrophic models. 2.1 The barotropic model and the two-dimensional quasi-geostrophic equation. 2.2. Three-dimensional quasi-geostrophic equation. 2.3. The multi-layer quasi-geostrophic model. 2.4. The surface quasi-geostrophic equation -- 3. Well-posedness and global attractors of the primitive equations. 3.1. Existence of weak solutions and trajectory attractors of the moist atmospheric equations. 3.2. Long-time behavior of the strong solutions of the primitive equations of the large-scale moist atmosphere. 3.3. The global well-posedness of the primitive equations. 3.4. Global well-posedness of primitive equations of the oceans -- 4. Random dynamical systems of atmosphere and ocean. 4.1. Random attractors of two-dimensional quasi-geostrophic dynamical system. 4.2. Global well-posedness and attractors of 3D stochastic primitive equations of the large-scale oceans. 4.3. The primitive equations of large-scale oceans with random boundary -- 5. Stability and instability theory. 5.1 Stability and instability of gravity waves. 5.2. Instability of Rossby waves. 5.3. Stability of Rossby waves. 5.4. Critical Rayleigh number of Rayleigh-Benard convection
N2  - The book provides some recent works in the study of some infinite-dimensional dynamical systems in atmospheric and oceanic science. It devotes itself to considering some infinite-dimensional dynamical systems in atmospheric and oceanic science, especially in geophysical fluid dynamics. The subject on geophysical fluid dynamics mainly tends to focus on the dynamics of large-scale phenomena in the atmosphere and the oceans. One of the important contents in the dynamics is to study the infinite-dimensional dynamical systems of the atmospheric and oceanic dynamics. The results in the study of some partial differential equations of geophysical fluid dynamics and their corresponding infinite-dimensional dynamical systems are also given
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ER  -