Model help:DeltaBW: Difference between revisions

Model parameters

Uses ports

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Provides ports

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Main equations

• Water surface elevation

[math]\displaystyle{ \eta = \eta_{f}[s_{s} \left (t\right ), t] - S_{a}[x - s_{s}\left ( t \right )] }[/math]

(1)

• Exner equation for shock condition

[math]\displaystyle{ \left ( 1 - \lambda_{p} \right ) \int _{s_{s}\left (t\right )} ^ \left ( s_{b} \left (t\right ) \right ){\frac{\partial \eta}{\partial t}} d x = I_{f} \{q_{t}[s_{s}\left (t \right ), t] - q_{t} [s_{b}\left (t\right ),t] \} }[/math]

(2)

[math]\displaystyle{ \dot{s_{s}} = {\frac{1}{\left (S_{a} - S_{s} \right )}}[{\frac{I_{f} q_{ts}}{\left ( 1 - \lambda_{p}\right ) \left (s_{b} - s_{s} \right )}} - {\frac{\partial \eta _{f}}{\partial t}}|_{s_{s}}] }[/math]

(3)

[math]\displaystyle{ \left (S_{a} - S_{b} \right ) \dot{s}_{b} = \left (S_{a} - S_{s}\right ) \dot{s}_{s} + {\frac{\partial \eta _{f}}{\partial t}}|_{s_{s}} }[/math]

(4)

• Moving boundary coordinate

[math]\displaystyle{ \hat{x} = {\frac{x}{S_{s}\left (t\right )}} }[/math]

(5)

[math]\displaystyle{ \hat{t} = t }[/math]

(6)

• Exner equation for moving-boundary coordinate

[math]\displaystyle{ \left ( 1 - \lambda_{p} \right ) [\left ({\frac{\partial \eta_{f}}{\partial \hat{t}}} - {\frac{\dot{s}_{s}}{s_{s}}} \hat{x} {\frac{\partial \eta_{f}}{\partial \dot{x}}}\right )] = - {\frac{1}{s_{s}}} I_{f} {\frac{\partial q_{t}}{\partial \dot{x}}} }[/math]

(7)

• Shock condition for moving-boundary coordinate

[math]\displaystyle{ \left (s_{b} - s_{s} \right )[{\frac{\partial \eta_{f}}{\partial \hat{t}}}|_{\hat{x} = 1} + S_{a} \dot{s}_{s}] = {\frac{I_{f} q_{t} \left (1, \hat{t}\right )}{\left ( 1 - \lambda_{p}\right )}} }[/math]

(8)

• Continuity condition for moving-boundary coordinate

[math]\displaystyle{ \dot{s}_{b} = {\frac{S_{a} \dot{s}_{s} + {\frac{\partial \eta _{f}}{\partial \hat{t}}}|_{\hat{x} = 1}}{\left ( S_{a} - S_{b}\right )}} }[/math]

(9)

• Sediment transport relation

1) Total bed material transport

[math]\displaystyle{ q_{t} = \sqrt{R g D} D q_{t} ^* }[/math]

(10)

[math]\displaystyle{ q_{t}^* = \alpha_{t}[\tau^* - \tau_{c}^*]^ \left (n_{t}\right ) }[/math]

(11)

• Backwater formula

[math]\displaystyle{ {\frac{dH}{d \hat{x}}} = s_{s} {\frac{S - S_{f}}{1 - Fr^2}} }[/math]

(12)

[math]\displaystyle{ S = - {\frac{1}{s_{s}}} {\frac{\partial \eta _{f}}{\partial \hat{x}}} }[/math]

(13)

[math]\displaystyle{ Fr^2 = {\frac{q_{w}^2}{g H^3}} }[/math]

(14)

[math]\displaystyle{ S_{f} = C_{f} Fr^2 }[/math]

(15)

[math]\displaystyle{ H \left (1,t\right ) = \xi_{s} \left (\hat{t} \right ) - \eta_{f} \left (1,\hat{t} \right ) }[/math]

(16)

[math]\displaystyle{ \tau^* = {\frac{\tau_{b}}{\rho R g D}} = {\frac{C_{f} U^2}{R g D}} = {\frac{C_{f} {\frac{q_{w}^2}{H^2}}}{R g D}} }[/math]

(17)

• Boundary conditions

[math]\displaystyle{ s_{s} \left ( \hat{t} + \Delta \hat{t} \right ) = s_{s} \left (\hat{t}\right ) + \dot{s}_{s} \Delta \hat{t} }[/math]

(18)

[math]\displaystyle{ s_{b} \left ( \hat{t} + \Delta \hat{t} \right ) = s_{b} \left (\hat{t}\right ) + \dot{s}_{b} \Delta \hat{t} }[/math]

(19)

[math]\displaystyle{ \eta_{b} \equiv \eta [S_{b} \left (\hat{t} \right ), \hat{t}] = \eta_{d} - S_{s} \left ( s_{b} - s_{s}\right ) }[/math]

(20)

• Calculation of derivatives

[math]\displaystyle{ {\frac{\partial \eta}{\partial \hat{x}}}|_{i} = \left\{\begin{matrix} {\frac{\eta_{i+1} - \eta_{i}}{\Delta \hat{x}}} & i = 1 \\ {\frac{\eta_{i+1} - \eta_{i-1}}{2 \Delta \hat{x}}} & i = 2...M \\ {\frac{\eta_{i} - \eta_{i-1}}{\Delta \hat{x}}} & i = M+1 \end{matrix}\right. }[/math]

(21)

[math]\displaystyle{ {\frac{\partial q_{t}}{\partial \hat{x}}}|_{i} = \left\{\begin{matrix} {\frac{q_{t,i} - q_{tf}}{ \Delta \hat{x}}} & i = 1 \\ {\frac{q_{t,i} - q_{t,i-1}}{ \Delta \hat{x}}} & 1 \lt i \lt = M+1 \end{matrix}\right. }[/math]

(22)

Notes

This module is a calculator for 1D Subaerial Fluvial Fan-Delta with Channel of Constant Width. This model assumes a narrowly channelized 1D fan-delta prograding into standing water. The model uses a single grain size D, a generic total bed material load relation and a constant bed resistance coefficient. The channel is assumed to have a constant width. Water and sediment discharge are specified per unit width.The channel is assumed to have a constant width. Water and sediment discharge are specified per unit width. The fan builds outward by forming a prograding delta front with an assigned foreset slope. The code employs a full backwater calculation.

In the normal flow formulation, for any given time t = t^: a) Specify the downstream bed elevation η_d

b) Calculate the backwater curve upstream from x^ = 1.

c) Use this to evaluate q_t everywhere, including q_ts at x^ = 1.

d) Implement the shock condition to find dot{s}_s. This shock condition requires knowledge of the term d η_f / d t^ |x^ = 1 . It is sufficient to evaluate this term using the current bed profile and that obtained one step earlier, at t^ = 0, this term can be ignored.

e) Solve Exner everywhere to find new bed elevations at time Δt^ later.

f) Use continuity condition to find dot{s}_b.

• Note on model running

A uniform grain size is assumed, and the same choice of Manning Strickler or Chézy is posed to the user.

The fan builds outward by forming a prograding delta front with an assigned foreset slope.

If the flow becomes supercritical, the backwater calculation will fail, so the program automatically alerts the user and exits.

The initial depth at the top of the foreset must be greater than the critical water depth H_crit; if it isn't the program will alert the user and exit

Examples

An example run with input parameters, BLD files, as well as a figure / movie of the output

Follow the next steps to include images / movies of simulations:

• Upload file: https://csdms.colorado.edu/wiki/Special:Upload
• Create link to the file on your page: [[Image:<file name>]].

See also: Help:Images or Help:Movies

Developer(s)

Gary Parker

References

• Grover, N.C., and Howard, C.L., 1937, The passage of turbid water through Lake Mead, Transactions, American Society of Civil Engineers, 103, 720-732.

• Kostic, S. and Parker, G., 2003a, Progradational sand-mud deltas in lakes and reservoirs. Part 1. Theory and numerical modeling, Journal of Hydraulic Research, 41(2), 127-140.

• Kostic, S. and Parker, G., 2003b, Progradational sand-mud deltas in lakes and reservoirs. Part 2. Experiment and numerical simulation, Journal of Hydraulic Research, 41(2), 141-152

• Swenson, J. B., Voller, V. R., Paola, C., Parker G. and Marr J., 2000, Fluvio-deltaic sedimentation: a generalized Stefan problem, European Journal of Applied Math., 11, 433-452.

Links

• Model:DeltaBW