Abstract
The topological characteristics for the basic system of equations of atmospheric motion were analyzed with the help of method provided by stratification theory. It was proved that in the local rectangular coordinate system the basic system of equations of atmospheric motion is stable in infinitely differentiable function class. In the sense of local solution, the necessary and sufficient conditions by which the typical problem for determining solution is well posed were also given. Such problems as something about “speculating future from past” in atmospheric dynamics and how to amend the conditions for determining solution as well as the choice of underlying surface when involving the practical application were further discussed. It is also pointed out that under the usual conditions, three motion equations and continuity equation in the basic system of equations determine entirely the property of this system of equations.
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Communicated by ZHOU Zhe-wei
Project supported by the National Natural Science Foundation of China (Nos.40175014, 90411006)
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Shi, Wh., Xu, M. & Wang, Yp. Stability for basic system of equations of atmospheric motion. Appl Math Mech 28, 261–268 (2007). https://doi.org/10.1007/s10483-007-0215-y
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DOI: https://doi.org/10.1007/s10483-007-0215-y