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${\displaystyle \int \limits _{A}{\nabla \cdot \left({{\Gamma }^{\phi }}h\nabla \phi \right)}{\text{d}}A=\oint \limits _{S}{{{\Gamma }^{\phi }}h\left(\nabla \phi \cdot \mathbf {n} \right)}{\text{d}}S=\sum \limits _{f}^{}{{\bar {\Gamma }}_{f}^{\phi }{{\bar {h}}_{f}}\Delta {{l}_{f}}{{\left({{\hat {n}}_{i}}{{\nabla }_{i}}\phi \right)}_{f}}}}$

First the momentum equations are rewritten as

${\displaystyle {\frac {\partial (hU_{i})}{\partial t}}+{\frac {\partial }{\partial x_{j}}}{\biggl (}(hU_{i}U_{j})-\nu _{t}h{\frac {\partial U_{i}}{\partial x_{j}}}{\biggr )}=-gh{\frac {\partial \eta }{\partial x_{i}}}+S_{i}}$

(1)

where ${\displaystyle S_{i}}$ includes all other terms. The equation is then integrated over the a control volume as

${\displaystyle {\frac {\partial }{\partial t}}\int _{A}hU_{i}dA+\oint _{F}{\frac {\partial }{\partial x_{j}}}{\biggl [}(hU_{i}U_{j})-\nu _{t}h{\frac {\partial U_{i}}{\partial x_{j}}}{\biggr ]}dF=-gh\oint _{F}{\frac {\partial \eta }{\partial x_{i}}}dF+\int _{A}S_{i}dA}$

(2)

The resulting di

${\displaystyle U_{i,P}^{n+1}={\frac {1}{a_{i,P}}}{\biggl (}\sum _{k=1}a_{i,k}U_{i,k}^{n+1}+S_{i}{\biggr )}-{\frac {h_{P}}{a_{i,P}}}\sum _{k=1}n_{ik}\Delta s_{k}p_{k}^{n+1}}$

The continuity equation is discretized as

${\displaystyle h^{n+1}-\mathbf {S} }$

where the subscript ${\displaystyle k}$ indicates the cell face, ${\displaystyle p=g\eta }$ with ${\displaystyle \eta }$ being the water surface elevation, ${\displaystyle n_{ik}}$ is equal to the dot product of the velocity unit vector and the cell face unit vector.

The coefficient ${\displaystyle a_{i,P}}$ is equal to ${\displaystyle a_{i,P}=\sum a_{i,k}+a_{P}^{0}}$

The continuity equation is discretized as ${\displaystyle p_{P}^{n+1}=p_{P}^{n}-g{\frac {\Delta t}{\Delta A_{P}}}\sum _{k=1}n_{k}F_{k}^{n+1}}$

where ${\displaystyle n_{k}}$ is the dot product of the cell face unit vector and

The depth-averaged 2-D continuity and momentum equations are given by

${\displaystyle {\frac {\partial h}{\partial t}}+{\frac {\partial (hU_{j})}{\partial x_{j}}}=S}$

(1)

for ${\displaystyle j=1,2}$