Title of article
An analytical solution for the local suspended sediment concentration profile in tidal sea region
Author/Authors
Kyung Tae Jung، نويسنده , , Jae Youll Jin، نويسنده , , Hyoun-Woo Kang، نويسنده , , Ho Jin Lee، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2004
Pages
11
From page
657
To page
667
Abstract
The time-averaged and oscillatory solutions of the one-dimensional vertical (1DV) advection–diffusion equation for the
suspended sediment have been derived analytically in a tidal sea region of finite water depth. The basic equation assumes constant
eddy diffusivity and settling velocity. No net flux condition is set at the sea surface, while a boundary condition with the erosion rate
and depositional velocity is prescribed at the sea bottom. The time-averaged solution has been derived in a straightforward manner,
while the advection–diffusion equation governing the oscillatory concentration has been first transformed to a simple diffusion
equation and then solved using the Galerkin-eigenfunction method. The former is given in a closed form, while the latter is presented
in a series solution.
A set of calculations has been performed to examine the change in the vertical structure as well as magnitude of the concentration
response function. A possible use of the solution to make an estimate of the erosion rate at the sea bottom based on the
concentration information at the sea surface is discussed.
Keywords
Analytical solution , eigenfunction , Galerkin method , settling velocity , advection–diffusion equation , suspended sediment
Journal title
Estuarine, Coastal and Shelf Science
Serial Year
2004
Journal title
Estuarine, Coastal and Shelf Science
Record number
952926
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