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Dakota Reference Manual
Version 6.15
Explore and Predict with Confidence
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Global Surrogate Based Optimization
This keyword is related to the topics:
Alias: none
Argument(s): none
Child Keywords:
Required/Optional | Description of Group | Dakota Keyword | Dakota Keyword Description | |
---|---|---|---|---|
Required (Choose One) | Sub-method Selection (Group 1) | method_pointer | Pointer to sub-method to apply to a surrogate or branch-and-bound sub-problem | |
method_name | Specify sub-method by name | |||
Required | model_pointer | Identifier for model block to be used by a method | ||
Optional | replace_points | (Recommended) Replace points in the surrogate training set, instead of appending | ||
Optional | max_iterations | Number of iterations allowed for optimizers and adaptive UQ methods |
The surrogate_based_global
specification must identify:
surrogate_based_global
works in an iterative scheme where optimization is performed on a global surrogate using the same bounds during each iteration.
In this way, the optimization acts on a more accurate surrogate during each iteration, presumably driving to optimality quickly.
Known Issue: When using discrete variables, there have been sometimes significant differences in surrogate behavior observed across computing platforms in some cases. The cause has not yet been fully diagnosed and is currently under investigation. In addition, guidance on appropriate construction and use of surrogates with discrete variables is under development. In the meantime, users should therefore be aware that there is a risk of inaccurate results when using surrogates with discrete variables.
Method Independent Controls
Notes
We have some cautionary notes before using the surrogate-based global method:
max_iterations
to 1 and will allow one to get a sense of what surrogate types are the most accurate to use for the problem. Expected HDF5 Output
If Dakota was built with HDF5 support and run with the hdf5 keyword, this method writes the following results to HDF5:
In surrogate-based optimization (SBO) and surrogate-based nonlinear least squares (SBNLS), minimization occurs using a set of one or more approximations, defined from a surrogate model, that are built and periodically updated using data from a "truth" model. The surrogate model can be a global data fit (e.g., regression or interpolation of data generated from a design of computer experiments), a multipoint approximation, a local Taylor Series expansion, or a model hierarchy approximation (e.g., a low-fidelity simulation model), whereas the truth model involves a high-fidelity simulation model. The goals of surrogate-based methods are to reduce the total number of truth model simulations and, in the case of global data fit surrogates, to smooth noisy data with an easily navigated analytic function.
It was originally designed for MOGA (a multi-objective genetic algorithm). Since genetic algorithms often need thousands or tens of thousands of points to produce optimal or near-optimal solutions, the use of surrogates can be helpful for reducing the truth model evaluations. Instead of creating one set of surrogates for the individual objectives and running the optimization algorithm on the surrogate once, the idea is to select points along the (surrogate) Pareto frontier, which can be used to supplement the existing points.
In this way, one does not need to use many points initially to get a very accurate surrogate. The surrogate becomes more accurate as the iterations progress.
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