Inflows/outflows driven particle dynamics in an idealised lake  被引量:2

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作  者:Cheng-hua Dang Jingchun Wang Qiuhua Liang 

机构地区:[1]School of Water Conservancy and Hydropower,Hebei University of Engineering,Handan 056021,China [2]Jeremy Benn Associates Limited,Coleshill,Warwickshire,UK [3]School of Architecture,Building and Civil Engineering,Loughborough University,Loughborough,UK

出  处:《Journal of Hydrodynamics》2019年第5期873-886,共14页水动力学研究与进展B辑(英文版)

基  金:Project supported by the National Natural Science Foundation of China(Grant No.11371117).

摘  要:This paper considers fluid mixing driven by inflows connected to a circular shallow lake using a numerical framework consisting of a shallow water hydrodynamic model and a passive particle-tracking model.With the flow field driven by alternate inflows predicted by a shallow water model,particle trajectories are traced out using a particle tracking model.The horizontal fluid mixing dynamics are then interpreted using dynamics system analysis approaches including finite-time Lyapunov exponent(FTLE)and Lagrangian coherent structure(LCS).From the simulation results,it is confirmed that periodic inflows are able to create a weak dynamic system in an idealised circular lake,with the particle dynamics controlled by a single dimensionless parameter associated with the inflow duration.The mixing and transport property of the lake changes from regular to chaotic as the value of the dimensionless parameter increases until global chaotic particle dynamics is achieved.By further analysing the advection of particles injected continuously to the inflows(freshwater),the fate of“freshwater”particles in a“polluted”lake is tracked and revealed.The results provide useful guidance for engineering applications,i.e.,transferring freshwater from rivers to improve the water quality in polluted water bodies such as lakes.The presented approach will be able to facilitate the design of‘optimised’schemes for such engineering implementation.

关 键 词:Shallow environmental flow LAGRANGIAN PARTICLE dynamics PARTICLE tracking INFLOWS and OUTFLOWS FINITE-TIME Lyapunov EXPONENT LAGRANGIAN coherent structure 

分 类 号:O17[理学—数学]

 

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