CMS-Flow Hydrodnamics: Variable Definitions

Phillips (1977), Mei (1983), and Svendsen (2006) provide a detailed deri-vation of the depth-integrated and wave-averaged hydrodynamic equa-tions. Here, only variable definitions are provided and derivations may be obtained from the preceding references. The instantaneous current velocity u_i is split into:

${\displaystyle u_{i}={\bar {u_{i}}}+{\tilde {u_{i}}}+u_{i}^{'}}$

in which

${\displaystyle {\bar {u_{i}}}}$ = current (wave-averaged) velocity [m/s]

${\displaystyle {\tilde {u_{i}}}}$ = wave (oscillatory) velocity with wave-average ${\displaystyle {\bar {\tilde {u_{i}}}}=0[m/s]}$

${\displaystyle u_{i}^{'}}$ = turbulent fluctuation with ensemble average ${\displaystyle \langle u_{i}^{'}\rangle }$ = 0 and wave average ${\displaystyle {\bar {u_{i}^{'}}}}$ = 0 [m/s]

The wave-averaged total volume flux is defined as

${\displaystyle hV_{i}}$ = ${\displaystyle {\bar {{\int _{z}^{\eta }}{u_{i}dz}}}}$

where

${\displaystyle h}$ = wave-averaged water depth ${\displaystyle h={\bar {\eta }}-z_{b}}$ [m]

${\displaystyle V_{i}}$ = total mean mass flux velocity or simply total flux velocity for short [m/s]

${\displaystyle u_{i}}$ = instantaneous current velocity [m/s]

${\displaystyle \eta }$ = instantaneous water level with respect to the Still Water Level (SWL) [m]

${\displaystyle z_{b}}$ = bed elevation with respect to the SWL [m]

For simplicity in the notation, the over bar in subsequent wave-averaged variables is omitted. The total flux velocity is also referred to as the mean transport velocity (Phillips 1977) and mass transport velocity (Mei 1983). The current volume flux is defined as

${\displaystyle hU_{i}=\int _{z}^{\eta }{\bar {u_{i}}}dz}$ (2-3)

where ${\displaystyle U_{i}}$ is the depth-averaged current velocity. Similarly, the wave volume flux is defined as by

${\displaystyle Q_{wi}=hU_{wi}={\bar {\int {\tilde {u_{i}}}dz}}}$

where ${\displaystyle U_{wi}}$ is the depth-averaged wave flux velocity [m/s], and ${\displaystyle \eta _{t}}$ = wave trough elevation [m]. Therefore the total flux velocity may be written as

${\displaystyle V_{i}=U_{i}+U_{wi}}$

On the basis of the above definitions, and assuming depth-uniform cur-rents, the general depth-integrated and wave-averaged continuity and momentum equations may be written as (Phillips 1977; Mei 1983; Svendsen 2006)

${\displaystyle {\frac {\partial h}{\partial t}}+{\frac {\partial (hV_{j})}{\partial x_{j}}}=S_{M}}$ (2-6)

${\displaystyle {\frac {\partial (hV_{i})}{\partial t}}+{\frac {\partial (hV_{j}V_{i})}{\partial x_{j}}}-\varepsilon _{ij}f_{c}hV_{j}=-gh{\frac {\partial {\bar {\eta }}}{\partial x_{i}}}-{\frac {h}{\rho }}{\frac {\partial p_{atm}}{\partial x_{i}}}}$

${\displaystyle +{\frac {\partial }{\partial x_{j}}}{\left(v_{t}h{\frac {\partial V_{i}}{\partial x_{j}}}\right)}-{\frac {1}{\rho }}{\frac {\partial }{\partial x_{j}}}\left(S_{ij}+R_{ij}-\rho hU_{wi}U_{wj}\right)+{\frac {\tau _{si}}{\rho }}-m_{b}{\frac {\tau _{bi}}{\rho }}}$ (2-7)

where

t = time[s]

${\displaystyle x_{j}}$ = Cartesian coordinate in the ${\displaystyle j^{tj}}$ direction [m]

${\displaystyle f_{c}}$ = Coriolis parameter [rad/s] ${\displaystyle =2\Omega sin\phi }$ where ${\displaystyle \Omega =7.29x10^{-5}}$ rad/s is the earth’s angular velocity of rotation and ${\displaystyle \phi }$ is the latitude in degrees

h = wave-averaged total water depth ${\displaystyle h=\zeta +{\bar {\eta }}}$ [m]

${\displaystyle {\bar {\eta }}=}$wave-averaged water surface elevation with respect to refer-ence datum [m]

${\displaystyle S_{M}=}$ water source/sink term due to precipitation, evaporation and structures (e.g. culverts) [m/s]

${\displaystyle V_{i}=}$total flux velocity defined as ${\displaystyle V_{i}=U_{i}+U_{wi}}$ [m/s]

${\displaystyle U_{i}=}$wave- and depth-averaged current velocity [m/s]

${\displaystyle U_{wi}=}$mean wave mass flux velocity or wave flux velocity for short [m/s]

${\displaystyle g=}$ gravitational constant (~9.81 m/s²)

${\displaystyle p_{atm}=}$atmospheric pressure [Pa]

${\displaystyle \rho =}$ water density (~1025 kg/m³)

${\displaystyle v_{t}=}$ turbulent eddy viscosity [m²/s]

${\displaystyle \tau _{si}=}$ wind surface stress [Pa]

${\displaystyle S_{ij}=}$ wave radiation stress [Pa]

${\displaystyle R_{ij}=}$ surface roller stress [Pa]

${\displaystyle m_{b}=}$ bed slope coefficient [-]

${\displaystyle \tau _{bi}=}$ combined wave and current mean bed shear stress [Pa]

The equations above are similar to those derived by Svendsen (2006), ex-cept for the inclusion of the water source/sink term in the continuity equation and the atmospheric pressure and surface roller terms in the momentum equation. It is also noted that the horizontal mixing term is formulated differently as a function of the total flux velocity, similar to the Generalized Lagrangian Mean (GLM) approach (Andrews and McIntyre 1978; Walstra et al. 2000). This approach is arguably more physically meaningful and also simplifies the discretization.

Figure 2-1 shows the vertical conventions used for mean water surface elevation and bed elevations. The arrows indicate the reference elevation for each variable. Note that the total water depth is always positive.

Figure 2-1 here.

Figure 2.1 Vertical conventions used for mean water surface elevation and bed elevations.