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1	Multiple equilibria and their stability in a barotropic and baroclinic atmosphere Rambaldi, Sandro January 1982 (has links) Thesis (Ph.D.)--Massachusetts Institute of Technology, Dept. of Meteorology and Physical Oceanography, 1982. / Microfiche copy available in Archives and Science / Includes bibliographies. / by Sandro Rambaldi. / Ph.D. Meteorology and Physical Oceanography. Baroclinicity Mathematical models
2	Numerical simulations of nonlinear baroclinic instability with a spherical wave-mean flow model Wang, Chunzai 11 June 1991 (has links) A global, multi-level, wave-mean flow model based on an approximate version of the primitive equations is developed to investigate the development of a baroclinic wave field initially confined to a single zonal wavenumber. The effects of physical processes (surface drag and thermal damping) and internal diffusion on the evolution have been examined. The nature of the mean flow adjustment by the nonlinear baroclinic waves is also studied. For a simulation with a relatively strong internal diffusion it is found that a single life cycle characterized by baroclinic growth and barotropic decay is obtained (as in Simmons and Hoskins, 1978), whereas with weaker diffusion the wave undergoes secondary life cycles before a nearly wave-free state is reached (as in Barnes and Young, 1991). In an experiment with weak 4th order diffusion secondary life cycles occur with little net decay. Relatively strong barotropic growth follows the initial life cycle. In experiments with surface drag (Rayleigh friction) and thermal damping (Newtonian cooling), repeated life cycles of baroclinic growth and barotropic decay can be obtained. It is found that in the complete absence of surface drag, the flow evolves to a nearly wave-free state after one secondary cycle. This demonstrates that surface drag plays an important role in nonlinear baroclinic instability. With relatively strong surface drag multiple life cycle behavior is found for sufficiently strong thermal damping. Such a behavior strengthens for very strong thermal damping. A steady wave state in which the wave amplitude equilibrates at an essentially constant level has only been obtained with very strong "potential vorticity damping". Both the "barotropic governor" process (James and Gray, 1986) and the baroclinic adjusment process are responsible for major parts of the stabilization of the mean flow in simulations with and without surface drag and thermal damping. However, the "barotropic governor" process dominates the flow evolution in the model simulations without surface drag and thermal damping. The "barotropic governor" modifies the meridional gradient of zonal mean potential vorticity, which influences the baroclinic adjustment. / Graduation date: 1992 Baroclinicity -- Mathematical models Atmospheric waves -- Mathematical models
3	Instabilities and radiation of thin, baroclinic jets Talley, Lynne E January 1982 (has links) Thesis (Ph.D.)--Massachusetts Institute of Technology, Dept. of Meteorology and Physical Oceanography, 1982. / Microfiche copy available in Archives and Science / Bibliography: leaves 228-233. / Lynne D. Talley. / Ph.D. Meteorology and Physical Oceanography. Baroclinicity Mathematical models Eddy flux Ocean currents Mathematical models Ocean circulation Mathematical models
4	The baroclinic instability of simple and highly structured one-dimensional basic states Fullmer, James William Anthony January 1979 (has links) Thesis (Ph.D.)--Massachusetts Institute of Technology, Dept. of Meteorology, 1979. / Microfiche copy available in Archives and Science. / Bibliography: leaves 231-234. / by James William Anthony Fullmer. / Ph.D. Meteorology Baroclinicity Mathematical models Heat budget (Geophysics) Eddy flux
5	Correlations between eddy heat fluxes and baroclinic instability St. Pierre, Richard W January 1979 (has links) Thesis (M.S.)--Massachusetts Institute of Technology, Dept. of Meteorology, 1979. / Microfiche copy available in Archives and Science. / Bibliography : leaf 83. / by Richard St. Pierre. / M.S. Meteorology Baroclinicity Mathematical models Eddy flux Mathematical models Heat budget (Geophysics)
6	Generation of mid-ocean eddies : the local baroclinic instability hypothesis Arbic, Brian K January 2000 (has links) Thesis (Ph.D.)--Joint Program in Physical Oceanography (Massachusetts Institute of Technology, Dept. of Earth, Atmospheric, and Planetary Sciences and the Woods Hole Oceanographic Institution), 2000. / Includes bibliographical references (p. 284-290). / by Brian Kenneth Arbic. / Ph.D. Woods Hole Oceanographic Institution. Joint Program in Physical Oceanography. Eddies Mathematical models Vortex-motion Mathematical models Baroclinicity Mathematical models Dynamic meteorology

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