Difference between revisions of "Using a model"
Line 34: | Line 34: | ||
== Available methods == | == Available methods == | ||
− | Once the model is loaded you can invoke a number methods on it. | + | '''Note this discussion refers to the SUMO-Toolbox version 6.1''' |
+ | |||
+ | Once the model is loaded you can invoke a number methods on it. We list the main ones below. For a full list of available methods just use the matlab 'methods' command: | ||
+ | |||
+ | <code><pre> | ||
+ | >>methods(model) | ||
+ | </pre></code> | ||
=== guiPlotModel === | === guiPlotModel === | ||
− | The easiest way to explore a model is to use the graphical model browser | + | The easiest way to explore a model is to use the graphical model browser. [[Model Visualization GUI|See here for more information]] |
=== plotModel === | === plotModel === | ||
<code><pre> | <code><pre> | ||
− | >>[figureHandle | + | >>[figureHandle] = plotModel(model,[outputNumber],[options]) |
</pre></code> | </pre></code> | ||
− | <code>plotModel</code> will generate an indicative plot of the model surface. To do so, it evaluates the model on a reasonably | + | <code>plotModel</code> will generate an indicative plot of the model surface. To do so, it evaluates the model on a reasonably dense grid of points. |
<code>plotModel</code> optional parameters: | <code>plotModel</code> optional parameters: | ||
* <code>outputNumber</code>: optional parameter, an integer specifying which output to plot | * <code>outputNumber</code>: optional parameter, an integer specifying which output to plot | ||
− | * <code>options</code>: optional parameter, a struct containing a number of options you can set. To | + | * <code>options</code>: optional parameter, a struct containing a number of options you can set. To get the default options simply call <code>Model.getPlotDefaults()</code>. |
Line 60: | Line 66: | ||
* '''Higher dimensional problems''': All variables after the fifth are fixed at 0, and plotting proceeds as if the model was five dimensional. | * '''Higher dimensional problems''': All variables after the fifth are fixed at 0, and plotting proceeds as if the model was five dimensional. | ||
− | + | The toolbox handles complex valued outputs as their modulus (= absolute value = magnitude) for plotting purposes. These plots are just visual aids for monitoring the modeling process. Phase data can be extracted from the model files. | |
− | The toolbox handles | ||
− | |||
− | |||
− | |||
− | |||
− | |||
− | |||
− | |||
− | |||
− | |||
− | |||
− | |||
− | |||
=== evaluate === | === evaluate === | ||
Line 80: | Line 73: | ||
</pre></code> | </pre></code> | ||
− | This evaluates the model on the given samples. The samples should be provided in simulator space. Simulator space is defined by the range in the [[Data_format|simulator configuration]]. If no range (minimum and maximum) | + | This evaluates the model on the given samples. The samples should be provided in simulator space. Simulator space is defined by the range in the [[Data_format|simulator configuration]]. If no range (minimum and maximum) was specified, the domain is assumed to be [-1,1]. |
− | === | + | === evaluateDerivative === |
<code><pre> | <code><pre> | ||
− | >> values = | + | >> values = evaluateDerivative(model, samples, [outputIndex]); |
</pre></code> | </pre></code> | ||
− | This | + | This approximates the partial derivatives of the model at each given sample. Note that the base class implementation is a very simple approximation. Models can override this function to provide more accurate derivatives (e.g., Kriging does this already). However, in its current form it is already useful. |
=== getSamples === | === getSamples === | ||
Line 115: | Line 108: | ||
</pre></code> | </pre></code> | ||
− | Returns the symbolic mathematical expression of this model (e.g., 3*x1^2 - 2*x2 +5). Note that not all model types implement this | + | Returns the symbolic mathematical expression of this model (e.g., 3*x1^2 - 2*x2 +5). Note that not all model types implement this. |
− | === | + | === construct === |
<code><pre> | <code><pre> | ||
− | >> | + | >> model = construct(model,samples); |
</pre></code> | </pre></code> | ||
− | + | This will build/train/fit.. the model on the given set of data points and return the updated model. | |
− | === | + | === freeParams === |
<code><pre> | <code><pre> | ||
− | >> | + | >> n = freeParams(model); |
</pre></code> | </pre></code> | ||
− | Returns | + | Returns the number of free parameters in the model. By default this returns the number of datapoints the model was built with but this is overridden by some model types. For example, an ANN model returns the number of weights in the network while a rational model returns the number of coefficients. |
− | |||
− | + | == Model space vs Simulator space == | |
== Model Optimization == | == Model Optimization == |
Revision as of 01:35, 7 February 2009
This page explains what you can do with a SUMO generated model.
Loading a model from disk
As the SUMO Toolbox builds models, each current best model is stored as a Matlab mat file in the output directory (e.g.: output/Academic_2D_Twice_rep01_run00_2008.05.20_10-27-18/models_out/model_0002.mat
).
In order to load this model from disk and actually use it, do the following:
- Start Matlab, make sure the SUMO Toolbox is in your path and navigate to the directory where the model file is stored
- Load the model from disk as follows:
- >>
modelFile = load('model_0002.mat');
- >>
model = modelFile.model;
- >>
Now the model is available as the variable 'model' in the Matlab workspace.
Model portability
How do you exchange and/or export SUMO models.
The other person has the SUMO Toolbox installed
The model 'mat' files can be shared with other people. In order for somebody else to use your saved model the following conditions need to be satisfied:
- The person has the SUMO Toolbox in his Matlab path
- The person should be using a similar Matlab version (including toolboxes) as was used to create the model file (preferably equal)
- The person should be using a similar SUMO Toolbox version as was used to create the model file (preferably equal)
We do not guarantee portability if the the above versions differ.
The other person does NOT have the SUMO Toolbox installed
In this case you can use the getExpression and exportToMFile (available from v6.0) methods. See below.
Available methods
Note this discussion refers to the SUMO-Toolbox version 6.1
Once the model is loaded you can invoke a number methods on it. We list the main ones below. For a full list of available methods just use the matlab 'methods' command:
>>methods(model)
guiPlotModel
The easiest way to explore a model is to use the graphical model browser. See here for more information
plotModel
>>[figureHandle] = plotModel(model,[outputNumber],[options])
plotModel
will generate an indicative plot of the model surface. To do so, it evaluates the model on a reasonably dense grid of points.
plotModel
optional parameters:
outputNumber
: optional parameter, an integer specifying which output to plotoptions
: optional parameter, a struct containing a number of options you can set. To get the default options simply callModel.getPlotDefaults()
.
To determine which kind of plot is generated, one makes a distinction based on the dimension of the input space:
- One dimensional models are always plotted in a simple XY line chart. Samples are shown as dots.
- Two dimensional models are plotted as a Matlab *mesh* plot, i.e. a colored surface. The colors are just an indication of height and don't have any further meaning. The samples are plotted as dots, and should (hopefully) approach the surface.
- Three dimensional problems are plotted used a custom built Slice Plot.
- Four dimensional problems are plotted using 3 Slice Plots. The leftmost plot fixes the variable of the fourth variable at -1, the middle plot at 0 and the rightmost plot at 1 (thus reducing the function to a three dimensional function, making a slice plot possible
- Five dimensional problems are plotted using 9 Slice Plots. The fourth and fifth variables are fixed at values of -1, 0 and 1. Indicators below the plots show where the variables were fixed.
- Higher dimensional problems: All variables after the fifth are fixed at 0, and plotting proceeds as if the model was five dimensional.
The toolbox handles complex valued outputs as their modulus (= absolute value = magnitude) for plotting purposes. These plots are just visual aids for monitoring the modeling process. Phase data can be extracted from the model files.
evaluate
>> values = evaluate(model, samples);
This evaluates the model on the given samples. The samples should be provided in simulator space. Simulator space is defined by the range in the simulator configuration. If no range (minimum and maximum) was specified, the domain is assumed to be [-1,1].
evaluateDerivative
>> values = evaluateDerivative(model, samples, [outputIndex]);
This approximates the partial derivatives of the model at each given sample. Note that the base class implementation is a very simple approximation. Models can override this function to provide more accurate derivatives (e.g., Kriging does this already). However, in its current form it is already useful.
getSamples
>> samples = getSamples(model);
Returns the samples that were used to fit the model. The samples are returned in simulator space.
getValues
>> values = getValues(model);
Returns the values that correspond to the samples from getSamples().
getDescription
>> desc = getDescription(model);
Returns a string with a user friendly description of the model.
getExpression
>> desc = getExpression(model,[outputNumber]);
Returns the symbolic mathematical expression of this model (e.g., 3*x1^2 - 2*x2 +5). Note that not all model types implement this.
construct
>> model = construct(model,samples);
This will build/train/fit.. the model on the given set of data points and return the updated model.
freeParams
>> n = freeParams(model);
Returns the number of free parameters in the model. By default this returns the number of datapoints the model was built with but this is overridden by some model types. For example, an ANN model returns the number of weights in the network while a rational model returns the number of coefficients.
Model space vs Simulator space
Model Optimization
To optimize the model, Matlab requires a function handle to the objective function (= the model object). You can construct a function handle from the model object as follows (example for the 3D case):
handle = @(x,y,z) evaluate( model, [x,y,z] );
Afterwards, you can pass that handle to your optimization procedure, or use it through feval
:
fmincon( handle, ... );
feval( handle, 0, 1, -1 );