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The season impact is represented by a yearly variation of the factor C.
The impact of different seasons is represented by an annual pattern of the factor C.


<math>C=0.05 \cdot \sin\frac{2\pi}{365}(i+0.75)+0.85</math>
<math>C=0.05 \cdot \sin\frac{2\pi}{365}(i+0.75)+0.85</math>

Version vom 25. November 2020, 11:29 Uhr

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The simulation of natural catchment areas requires calculating the processes of runoff generation, distribution and concentration. The methods of calculation used are described below.


Load Generation

Load generation is the process of determining the precipitation for the considered catchment area. In Talsim-NG, each sub-basin uses only one precipitation source. If there are several precipitation measurement stations in the catchment area, you can either divide the area into several sub-basins or aggregate precipitation sources, until only one precipitation source can be assigned to each element.


Runoff generation for permeable/impermeable areas

Runoff generation determines the amount of effective precipitation from the rainfall. From this, the components surface runoff, infiltration, evaporation and interflow are derived. By defaut, snow calculation is carried out at temperatures below zero °C and is based on the Snow-Compaction-Method. Regarding the algorithms of the method, reference is made to the relevant literature. The natural process from precipitation to runoff is divided into individual phases for the mathematical simulation. In the runoff generation phase, the precipitation (system load) is divided into the "effective precipitation" which is transformed into runoff, and the losses not affecting runoff (wetting, depression, evaporation and infiltration losses). Therefore, this phase is also called load distribution. The resulting mathematical equation for the momentary load distribution is as follows:

[math]\displaystyle{ N_W(t) =N(t) -VP(t) -I(t) - \frac{dO}{dt} - \frac{dS}{dt} }[/math]

with:

[math]\displaystyle{ N_W }[/math]: Runoff-effective precipitation
[math]\displaystyle{ N }[/math]: Precipitation
[math]\displaystyle{ VP }[/math]: Potential evaporation
[math]\displaystyle{ I }[/math]: Infiltration into the soil
[math]\displaystyle{ O }[/math]: Surface water supply
[math]\displaystyle{ S }[/math]: Snow storage

In the following, the terms used in the equation and their calculation are explained in detail.


Precipitation N(t)

Precipitation data must be provided to the simulation model in the form of time series. In principle, it is irrelevant whether the precipitation series is a block rain, a model rain, a time series of natural observed rainfall, a rain spectrum or a long-term rainfall time series. The appropriate load has to be selected depending on the objective of the simulation. The rainfall time series are either taken from the time series management of Talsim-NG or, when carrying out a short-term forecast, are generated by entering a duration, an amount and by selecting a model rain directly before a simulation.


Evaporation VP(t)

Evaporation has a double effect on runoff generation. On the one hand, the initial conditions in the catchment area (interception and depression storage on the surface as well as to a limited degree the soil moisture of permeable areas) are a result of the evaporation taking place before the considered precipitation event. On the other hand, the current runoff-effective precipitation is affected by the amount of the current evaporation rate. The potential (energetically possible) evaporation VP varies in time and place and is very difficult to calculate exactly. Using evaluated measurements of 20 stations, the mean values of which are presented in the following histogram, the following compensation function was determined /BRANDT, 1979/.

[math]\displaystyle{ VP=(0.96+0.0033 \cdot i) \cdot \sin\frac{2\pi}{365}(i-148)+158 }[/math]

with:

[math]\displaystyle{ i }[/math]: current day of the hydrological year
[math]\displaystyle{ i=1 }[/math]: November 1

The total annual potential evaporation height in this sample is 642 mm. If no measured evaporation values are available, this normalized annual potential evaporation pattern can optionally be used to calculate the current evaporation. If the simulation time step is less than one day, the potential evaporation for each time step is additionally determined using the daily pattern displayed below. If the calculation interval is more than 1 day, the daily pattern is not taken into account.

Surface water storage (impermeable areas) O

For impermeable areas, snow storage and infiltration can be neglected, so that the balance equation is simplified as follows:

[math]\displaystyle{ N_W(t)=N(t)-VP(t)-\frac{dO}{dt} }[/math]

The change in surface water storage [math]\displaystyle{ dO/dt }[/math] represents the wetting of the surface as well as the filling and emptying (by evaporation) of depressions.

Schematic of wetting and depression losses

The following default value [math]\displaystyle{ BV }[/math] is used as wetting loss for impermeable areas.

[math]\displaystyle{ BV = 0.5 \mbox{ mm} }[/math]

Depression losses (MV) are specified by the user. The default and simultaneously maximum value in the model is 4 mm. Depression losses represent an average value for an sloped surface. Since depressions are not evenly distributed and runoff already begins before all depressions are completely filled, it is assumed that

  • 1/3 of the impermeable area has a reduced depression loss of 1/3⋅MV
  • 1/3 of the impermeable area has the average depression loss of MV
  • 1/3 of the impermeable area has an increased depression loss of 5/3⋅MV

Therefore, runoff already occurs when the precipitation reduced by the evaporation rate exceeds the wetting loss and 1/3 of the depression losses (in case of dry starting conditions). The assumptions described above are shown as a schematic in the following figure.

The runoff coefficient of the impermeable areas (after covering the initial losses) is set at [math]\displaystyle{ \Psi = 1 }[/math]. When determining the portion of impermeable areas for a sub-basin, you must take into account that not all paved or sealed surfaces actually drain into a sewer system. The continuous provision of wetting and depression losses is achieved by continuously balancing the corresponding storages and the evaporation.


Surface water supply (unsealed area)

The surface water storage of permeable areas is calculated by balancing a loss storage depending on the selected runoff generation approach. Details can be found in the following sections on the calculation of infiltration and runoff-effective precipitation.


Infiltration and runoff-effective precipitation I(t), NW(t)

In the case of permeable areas, infiltration into the soil cannot be neglected, since this has a decisive influence on the runoff. For the calculation three approaches are implemented in the model:

  1. Constant discharge coefficient [math]\displaystyle{ \Psi }[/math]
  2. Event-specific discharge coefficient based on the Soil-Conservation-Service (SCS) method
  3. Soil moisture simulation


Constant discharge coefficient Ψ

If a [math]\displaystyle{ \Psi }[/math] value is given, the remaining part of the precipitation after covering the initial losses (wetting and depression losses) is converted to runoff by multplying with [math]\displaystyle{ \Psi }[/math], independent of the history and the characteristics of the rainfall event (amount, intensity, duration). If possible, this approach should be avoided, since the process of runoff formation is greatly simplified.


Event-specific discharge coefficient based on the Soil-Conservation-Service (SCS) method

Using a CN value that is dependent on the soil type and land use (see /DVWK, 1991/), the initial losses and a relationship between the runoff coefficient and the accumulated rainfall amount up to the current point in time can be derived, both of which are dependent on previous conditions /Zaiss, 1987/. With this approach, the runoff coefficient increases with increasing precipitation amount during the course of the rainfall event. The quantification of the previous conditions is based on the 21-day-precipitation index [math]\displaystyle{ VN }[/math].

[math]\displaystyle{ V_N=\sum_{j=1}^21 C(j)^j \cdot hN_j }[/math]

with:

[math]\displaystyle{ hN_j }[/math]: Precipitation amount of the j-th previous day
[math]\displaystyle{ C(j) }[/math]: Factor describing the influence of the j-th previous day

The impact of different seasons is represented by an annual pattern of the factor C.

[math]\displaystyle{ C=0.05 \cdot \sin\frac{2\pi}{365}(i+0.75)+0.85 }[/math]

with:

[math]\displaystyle{ i }[/math]: current day of the outflow year

As a result, the value C ranges between 0.8 < C < 0.9. This ensures that different rainfall indices are calculated for the same amount of rainfall at different times of the year and therefore a changed willingness to flow is taken into account. Depending on the prehistory quantified in this way, a current discharge coefficient can be calculated using the CN values specific to the area and valid for average prehistory conditions. The following figure shows for different CN-values how the current discharge coefficient changes depending on the prehistory. Since the runoff readiness of a catchment area changes in the course of a rainfall event due to soil moisture, the runoff coefficient is also adjusted during an event as a function of the cumulative precipitation height.


Soil Moisture Simulation

Land use

When using soil moisture simulation, it is necessary to specify the land use. From the information about land use, the rooting depth is needed to determine the thickness of the rooting layer. Further parameters of land use, which are used to calculate interception and transpiration, are

  • Root depth
  • Coverage rate
  • Annual cycle of the degree of coverage
  • Leaf area index
  • Year of the leaf area index

Haude factors can be assigned to each land use for a better consideration of the evaporation by entering annual courses.


Soil type/ Soil texture
Example of the summary of the soil layers to an internal program layer based on the rooting layer
Sizes calculated with the soil moisture simulation

The soil moisture simulation is based on a non-linear calculation of the individual soil horizons. The soil is divided into different horizons (layers). Each layer is calculated and compared with the layers below or above (if available). The following soil physical parameters are used as parameters for the soil moisture calculation:

  • Wilting point (WP)
  • Field capacity (FK)
  • Total pore volume (GPV)
  • Saturated conductivity (kf value)
  • Maximum infiltration capacity (Max.Inf.)
  • Maximum rate of capillary suction (Max.Cap.)
  • Assignment to a soil type: sand, silt, clay

The possible number of soil layers ranges from a minimum of one to a maximum of six. Experience has shown that the best results are achieved with a division into three layers. For this reason, the entered layers are always divided into three horizons within the program.

  • Infiltration layer (standard thickness [cm] = 20)
  • Rooted layer (minimum thickness [cm] = 5)
  • Transport layer (minimum thickness [cm] = 5)

The calculation of the new soil properties for the layers used within the program is done by weighting them according to the given original thicknesses of the layers. In case of saturated conductivity the calculation is based on the principle of maintaining the continuity of the flow. In the case of vertical flow, the velocity v at a given flow rate in a program internal layer should have the same value due to the continuity of the flow. Thus, the hydraulic gradient is no longer constant.

[math]\displaystyle{ kf_V=\frac{\sum_{i=1}^n d_i}{\sum_{i=1}^n \frac{d_i}{k_i}} }[/math]

with:

[math]\displaystyle{ d_i }[/math]: proportional layer thickness of the respective original layer [mm]
[math]\displaystyle{ k_i }[/math]: saturated conductivity of the respective original layer [mm/h]
[math]\displaystyle{ kf_V }[/math]: saturated conductivity of the layer used within the program [mm/h]
Scheme of determination of the current evaporation

The water balance equation for a soil layer is solved on the basis of the area-wise linear representation of the process functions infiltration, current evaporation (evaporation + transpiration), percolation, interflow and capillary suction, which influence soil moisture. The input variable for evaporation and transpiration is determined from the potential evaporation. The equation to be solved is:

[math]\displaystyle{ \frac{dBF(t)}{dt}=Inf(t)-Perk(t)-Eva_{akt}(t)-Trans_{akt}(t)-Int(t)+Kap(t) }[/math]

with:

[math]\displaystyle{ BF(t) }[/math]: current soil moisture
[math]\displaystyle{ Inf(t) }[/math]: Infiltration into the soil
[math]\displaystyle{ Perk(t) }[/math]: Percolation (seepage)
[math]\displaystyle{ Eva_{akt}(t) }[/math]: current evaporation
[math]\displaystyle{ Trans_{akt}(t) }[/math]: current transpiration
[math]\displaystyle{ Int(t) }[/math]: interflow
[math]\displaystyle{ Kap(t) }[/math]: capillary suction
Display of selected soil process functions

Infiltration, percolation, evaporation, transpiration, interflow and capillary suction depend on the current soil moisture. In the simulation, this dependence is described by the following function courses.

[math]\displaystyle{ Inf(BF(t))=a_v \cdot \left(GPV-BF(t) \right)^{1.4}+k_f }[/math]           (Approach according to HOLTAN)

[math]\displaystyle{ Perk(BF(t)) = \begin{cases} 0, & BF(t)\le f_{PK} \cdot nFK + WP \\ k_f \cdot \left(\frac{BF(t)-(f_{PK} \cdot nFK +WP)}{GPV-(f_{PK} \cdot nFK +WP)} \right)^{exp,PK}, & BF(t)\gt f_{PK} \cdot nFK + WP \end{cases} }[/math]

(mod. Ansatz nach /OSTROWSKI, 1992/)

[math]\displaystyle{ Eva(BF(t)) = \begin{cases} 0, & BF(t)\le WP \\ f_{Eva} \cdot \left(\frac{BF(t)-WP}{GPV-WP} \right)^{exp,PK}, & BF(t)\gt WP \end{cases} }[/math]

[math]\displaystyle{ Trans(BF(t)) = \begin{cases} 0, & BF(t)\le f_{Trans} \cdot nFK + WP \\ f_{Trans} \cdot \left(\frac{BF(t)-(f_{Trans} \cdot nFK +WP)}{GPV-(f_{Trans} \cdot nFK +WP)} \right)^{exp,PK}, & BF(t)\gt f_{Trans} \cdot nFK + WP \end{cases} }[/math]

with:

[math]\displaystyle{ a_v }[/math]: infiltration factor according to HOLTAN (in Talsim-NG [math]\displaystyle{ a_v=1 }[/math]
[math]\displaystyle{ k_f }[/math]: coefficient of permeability of saturated soil
[math]\displaystyle{ nFK }[/math]: usable field capacity ([math]\displaystyle{ nFK=FK-WP }[/math])
[math]\displaystyle{ WP }[/math]: wilting point
[math]\displaystyle{ FK }[/math]: field capacity
[math]\displaystyle{ GPV }[/math]: total pore volume
[math]\displaystyle{ f_{PK} }[/math]: soil-dependent scaling factor of the percolation function
[math]\displaystyle{ exp,PK }[/math]: soil-dependent curvature parameter of the percolation function
[math]\displaystyle{ f_{Eva} }[/math]: soil dependent scaling factor of the evaporation function
[math]\displaystyle{ f_{Trans} }[/math]: soil-dependent scaling factor of the transpiration function
[math]\displaystyle{ exp,Trans }[/math]: curvature parameters of the transpiration function

The program parameters are calculated internally. The user only has to specify the soil parameters kf, WP, FK and GPV. The calculation of the soil processes is done with a newly developed component for the simulation of reservoirs.


Elementary surfaces

If the runoff generation is calculated with the soil moisture simulation, the elementary surface concept is applied at the same time. A catchment area element is thereby divided into any number of hydrologically homogeneous areas, i.e. areas of the same soil type and the same land use. For each elementary area there is exactly one assignment of land use and soil type. The amount of water resulting from an elementary surface is set at the element exit, i.e. all elementary surfaces release water with the same time delay, independent of their location in the catchment area.


Runoff concentration

The runoff concentration determines the delay of surface runoff from the catchment area. A parallel storage cascade with three reservoirs for unpaved and one cascade for paved areas is used. The outflow of the components interflow and groundwater is delivered delayed to the element outlet via a linear single storage tank.

Calculation of the discharge concentration of catchment areas