UNDER CONSTRUCTION

Analytical Solution

Dupont (2001) presented an analytical solution for a closed circular domain on an f-plane, with radius ${\displaystyle R}$, a linear bottom friction, and a spatially variable wind stress equal to ${\displaystyle \tau _{Wx}=Wy/R}$, ${\displaystyle \tau _{Wy}=0}$ where ${\displaystyle W}$ is the gradient of the wind forcing and ${\displaystyle y}$ is the vertical coordinate. The water surface elevation solution is given by

${\displaystyle \eta ={\begin{cases}{\frac {W{{r}^{2}}\sin 2\theta }{4gHR}},&{\mbox{if }}f_{c}=0\\{\frac {W{{f}_{c}}}{RgH\kappa }}\left[{\frac {{R}^{2}}{8}}+{\frac {{r}^{2}}{4}}\left({\frac {\kappa }{{f}_{c}}}\sin 2\theta -1\right)\right],&{\mbox{if }}f_{c}\neq 0\\\end{cases}}}$

(1)

The current velocities are independent of the Coriolis parameter and are given by

${\displaystyle u={\frac {Wy}{2R\kappa }}}$

(2)

${\displaystyle v=-{\frac {Wx}{2R\kappa }}}$

(3)

Setup

Figure 1. Computational grid.

The model is run to steady state from zero current and water level initial conditions with Failed to parse (syntax error): {\displaystyle W = 10^-4 \text{m^2s^{-2}} } , Failed to parse (syntax error): {\displaystyle \kappa = 10^{-3} \text{s^{-1}} </math , and both <math> f_c = 0} and Failed to parse (syntax error): {\displaystyle f_c = 10^{-4} \text{s^{-1}}} . Figure 1 shows the computational grid with 5 levels of refinement from 2000 m to 125 m.

Results

Table 2. Goodness of fit statistics for the water elevation

References

• Dupont, F., 2001. Comparison of numerical methods for modelling ocean circulation in basins with irregular coasts. Ph.D. thesis, McGill University, Montreal.

Test Cases

Documentation Portal