Surface model (Water Overlay): Difference between revisions

From Tygron Support wiki
Jump to navigation Jump to search
No edit summary
No edit summary
Line 34: Line 34:
* In addition to water flowing in between grid cells, water can also flow ''through'' [[Hydraulic structures (Water Overlay)|hydraulic constructions]].
* In addition to water flowing in between grid cells, water can also flow ''through'' [[Hydraulic structures (Water Overlay)|hydraulic constructions]].
* The [[Design flood elevation m model attribute (Water Overlay)|DESIGN_FLOOD_ELEVATION_M]] attribute confines the maximum surface elevation induced by constructions.
* The [[Design flood elevation m model attribute (Water Overlay)|DESIGN_FLOOD_ELEVATION_M]] attribute confines the maximum surface elevation induced by constructions.
==Related formulas==
* [[Surface water level formula (Water Overlay)|Surface water level formula]]
* [[Surface flow formula (Water Overlay)|Surface flow formula]]
* [[Surface infiltration formula (Water Overlay)|Surface infiltration formula]]
* [[Culvert formula (Water Overlay)|Culvert formula]]
* [[Weir formula (Water Overlay)|Weir formula]]
* [[Breach growth formula (Water Overlay)|Breach growth formula]]
* [[Breach flow formula (Water Overlay)|Breach flow formula]]
* [[Pump formula (Water Overlay)|Pump formula]]
* [[Sewer Overflow formula (Water Overlay)|Sewer overflow formula]]
* [[Inlet formula (Water Overlay)|Inlet formula]]
==Related models==
* [[Rain model (Water Overlay)|Rain model]]
* [[Evaporation model (Water Overlay)|Evaporation model]]
* [[Sewer model (Water Overlay)|Sewer model]]
* [[Storage model (Water Overlay)|Storage model]]
* [[Substance flow model (Water Overlay)|Substance flow model]]


==References==
==References==

Revision as of 08:59, 1 July 2019

Computation

The Water Module's primary function is simulating two-dimensional flow of water along the surface. In order to do this, the project area is first discretized into x by y cells depending on the configured grid cell size. Secondly, a set of rules is required that describes the behavior of the flow. This is done through a second-order semi-discrete central-upwind scheme produced by Kurganov and Petrova (2007)[1], which is based on the 2-D Saint-Venant equations (a.k.a. shallow water equations):

2D-Saint-Venant system.png

where

ht = water depth at time t
ut = velocity in the x direction at time t
vt = velocity in the y direction at time t
Bx = slope in the x direction
By = slope in the y direction
g = gravitational constant
For each grid cell:
B = bottom elevation
h = water depth
w = water surface elevation

This scheme deviates from the original Saint-Venant equations in that it approaches the system in terms of water surface elevation (w = h + B) and flux (hu and hv), rather than just the water depth (h). The image on the right aims to clarify on the various terms. More technical information on the Tygron Platform's implementation of the Well-Balanced Positivity Preserving Central-Upwind Scheme can be found here.

Flowing water

Imbalances in the water surface elevation among grid cells drive the flow of water in the model until a state of equilibrium is reached in terms of w and flux.

Water level initialization

In theory, each grid cell can have a unique bottom elevation and accompanying water depth, yielding a certain water surface elevation (or water level). However, in practice, water levels are often initialized for large groups of cells, assuming that each (water level) area in a project has been assigned a water level. During the initialization phase a distinction is made between two types:

For all water terrains in a water level area, the volume of water per grid cell is such that the resulting water level at those locations conforms the value of the WATER_LEVEL attribute as provided by the corresponding water level area.

In contrast to water level areas, which generate water on water terrains, inundation areas generate water over all grid cells, regardless of its terrain type. Similarly, the volume of water per grid cell is determined by the INUNDATION_LEVEL attribute as provided by the corresponding inundation area.

If a grid cell is neither part of any water level area nor inundation area, or the assigned water level is lower than its bottom elevation, the water depth is assumed to be zero and the water level becomes equal to the bottom elevation. In turn, this bottom (or surface) elevation is equal to the local terrain height of the project area, though it may be altered by the presence of a construction or the BREACH_HEIGHT attribute of a breach.

Notes

References

  1. Kurganov A, Petrova G (2007) ∙ A Second-Order Well-Balanced Positivity Preserving Central-Upwind Scheme for the Saint-Venant System ∙ found at: http://www.math.tamu.edu/~gpetrova/KPSV.pdf (last visited 2019-04-11)

Template:WaterOverlay nav