objective_functions

Response type suitable for optimization

Specification

• Alias: num_objective_functions

• Arguments: INTEGER

Child Keywords:

Required/Optional	Description of Group	Dakota Keyword	Dakota Keyword Description
Optional		sense	Whether to minimize or maximize each objective function
Optional		primary_scale_types	How to scale each objective function
Optional		primary_scales	Characteristic values to scale each objective function
Optional		weights	Specify weights for each objective function
Optional		nonlinear_inequality_constraints	Group to specify nonlinear inequality constraints
Optional		nonlinear_equality_constraints	Group to specify nonlinear equality constraints
Optional		scalar_objectives	Number of scalar objective functions
Optional		field_objectives	Number of field objective functions

Description

Specifies the number (1 or more) of objective functions \(f_j\) returned to Dakota for use in the general optimization problem formulation:

\[\begin{split}\begin{eqnarray*} \hbox{minimize:} & & f(\mathbf{x}) = \sum_j{w_j f_j} \\ & & \mathbf{x} \in \Re^{n} \\ \hbox{subject to:} & & \mathbf{g}_{L} \leq \mathbf{g(x)} \leq \mathbf{g}_U \\ & & \mathbf{h(x)}=\mathbf{h}_{t} \\ & & \mathbf{a}_{L} \leq \mathbf{A}_i\mathbf{x} \leq \mathbf{a}_U \\ & & \mathbf{A}_{e}\mathbf{x}=\mathbf{a}_{t} \\ & & \mathbf{x}_{L} \leq \mathbf{x} \leq \mathbf{x}_U \end{eqnarray*}\end{split}\]

Unless sense is specified, Dakota will minimize the objective functions.

The keywords nonlinear_inequality_constraints and nonlinear_equality_constraints specify the number of nonlinear inequality constraints g, and nonlinear equality constraints h, respectively. When interfacing to external applications, the responses must be returned to Dakota in this order in the results_file :

1. objective functions

2. nonlinear_inequality_constraints

3. nonlinear_equality_constraints

An optimization problem’s linear constraints are provided to the solver at startup only and do not need to be included in the data returned on every function evaluation. Linear constraints are therefore specified in the variables block through the linear_inequality_constraint_matrix \(A_i\) and linear_equality_constraint_matrix \(A_e\) .

Lower and upper bounds on the design variables x are also specified in the variables block.

The optional keywords relate to scaling the objective functions (for better numerical results), formulating the problem as minimization or maximization, and dealing with multiple objective functions through weights w. If scaling is used, it is applied before multi-objective weighted sums are formed, so, e.g, when both weighting and characteristic value scaling are present the ultimate objective function would be:

\[f = \sum_{j=1}^{n} w_{j} \frac{ f_{j} }{ s_j }\]