Litcius/Paper detail

Stochastic effects of waves on currents in the ocean mixed layer

Darryl D. Holm, Ruiao Hu

2021Journal of Mathematical Physics20 citationsDOIOpen Access PDF

Abstract

This paper introduces an energy-preserving stochastic model for studying wave effects on currents in the ocean mixing layer. The model is called stochastic forcing by Lie transport (SFLT). The SFLT model is derived here from a stochastic constrained variational principle, so it has a Kelvin circulation theorem. The examples of SFLT given here treat 3D Euler fluid flow, rotating shallow water dynamics, and the Euler–Boussinesq equations. In each example, one sees the effect of stochastic Stokes drift and material entrainment in the generation of fluid circulation. We also present an Eulerian averaged SFLT model based on decomposing the Eulerian solutions of the energy-conserving SFLT model into sums of their expectations and fluctuations.

Topics & Concepts

Eulerian pathStokes driftEuler's formulaEuler equationsEntrainment (biomusicology)Circulation (fluid dynamics)Stochastic modellingPhysicsMechanicsFlow (mathematics)Mixing (physics)Classical mechanicsForcing (mathematics)Geophysical fluid dynamicsStochastic processStatistical physicsMathematicsMathematical analysisWave propagationQuantum mechanicsRhythmLagrangianAcousticsStatisticsOceanographic and Atmospheric ProcessesFluid Dynamics and Turbulent FlowsOcean Waves and Remote Sensing