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On the propagation of nonlinear waves in the atmosphere

Adrian Constantin, R. S. Johnson

2022Proceedings of the Royal Society A Mathematical Physical and Engineering Sciences38 citationsDOIOpen Access PDF

Abstract

Starting from the general equations of fluid dynamics that describe the atmosphere, and using asymptotic methods, we present the derivation of the leading-order equations for nonlinear wave propagation in the troposphere. The only simplifying assumption is that the flow in the atmosphere exists in a thin shell over a sphere. The systematic approach adopted here enables us to find a consistent balance of terms describing the propagation, and to identify the temperature and pressure gradients that drive the motion, as well as the heat sources required. This produces a new nonlinear propagation equation that is then examined in some detail. With the morning glory in mind, we construct a few exact solutions, which, separately, describe breezes, bores and oscillatory motion.

Topics & Concepts

Atmosphere (unit)Nonlinear systemWave propagationMechanicsPrimitive equationsFlow (mathematics)TroposphereEquations of motionPhysicsClassical mechanicsMathematical analysisMeteorologyMathematicsSimultaneous equationsOpticsQuantum mechanicsMeteorological Phenomena and SimulationsClimate variability and modelsOceanographic and Atmospheric Processes