NAG Library Function Document
nag_glopt_bnd_pso (e05sac)
Note: this function uses optional parameters to define choices in the problem specification and in the details of the algorithm. If you wish to use default
settings for all of the optional parameters, you need only read Sections 1 to 10 of this document. If, however, you wish to reset some or all of the settings please refer to Section 11 for a detailed description of the algorithm and to Section 12 for a detailed description of the specification of the optional parameters.
1 Purpose
nag_glopt_bnd_pso (e05sac) is designed to search for the global minimum or maximum of an arbitrary function, using Particle Swarm Optimization (PSO). Derivatives are not required, although these may be used by an accompanying local minimization function if desired. nag_glopt_bnd_pso (e05sac) is essentially identical to
nag_glopt_nlp_pso (e05sbc), but with a simpler interface and with various optional parameters removed; otherwise most arguments are identical. In particular, nag_glopt_bnd_pso (e05sac) does not handle general constraints.
2 Specification
#include <nag.h> 
#include <nage05.h> 
void 
nag_glopt_bnd_pso (Integer ndim,
Integer npar,
double xb[],
double *fb,
const double bl[],
const double bu[],
void 
(*monmod)(Integer ndim,
Integer npar,
double x[],
const double xb[],
double fb,
const double xbest[],
const double fbest[],
const Integer itt[],
Nag_Comm *comm, Integer *inform),


Integer iopts[],
double opts[],
Nag_Comm *comm, Integer itt[],
Integer *inform,
NagError *fail) 

Before calling nag_glopt_bnd_pso (e05sac),
nag_glopt_opt_set (e05zkc) must be called with
optstr set to ‘
Initialize = e05sac’. Optional parameters may also be specified by calling
nag_glopt_opt_set (e05zkc) before the call to nag_glopt_bnd_pso (e05sac).
3 Description
nag_glopt_bnd_pso (e05sac) uses a stochastic method based on Particle Swarm Optimization (PSO) to search for the global optimum of a nonlinear function
$F$, subject to a set of bound constraints on the variables. In the PSO algorithm (see
Section 11), a set of particles is generated in the search space, and advances each iteration to (hopefully) better positions using a heuristic velocity based upon
inertia,
cognitive memory and
global memory. The inertia is provided by a decreasingly weighted contribution from a particles current velocity, the cognitive memory refers to the best candidate found by an individual particle and the global memory refers to the best candidate found by all the particles. This allows for a global search of the domain in question.
Further, this may be coupled with a selection of local minimization functions, which may be called during the iterations of the heuristic algorithm, the interior phase, to hasten the discovery of locally optimal points, and after the heuristic phase has completed to attempt to refine the final solution, the exterior phase. Different options may be set for the local optimizer in each phase.
Without loss of generality, the problem is assumed to be stated in the following form:
where the objective
$F\left(\mathbf{x}\right)$ is a scalar function,
$\mathbf{x}$ is a vector in
${R}^{\mathit{ndim}}$ and the vectors
$\mathbf{\ell}\le \mathbf{u}$ are lower and upper bounds respectively for the
$\mathit{ndim}$ variables. The objective function may be nonlinear. Continuity of
$F$ is not essential. For functions which are smooth and primarily unimodal, faster solutions will almost certainly be achieved by using
Chapter e04 functions directly.
For functions which are smooth and multimodal, gradient dependent local minimization functions may be coupled with nag_glopt_bnd_pso (e05sac).
For multimodal functions for which derivatives cannot be provided, particularly functions with a significant level of noise in their evaluation, nag_glopt_bnd_pso (e05sac) should be used either alone, or coupled with
nag_opt_simplex_easy (e04cbc).
The
$\mathit{ndim}$ lower and upper box bounds on the variable
$\mathbf{x}$ are included to initialize the particle swarm into a finite hypervolume, although their subsequent influence on the algorithm is user determinable (see the option
${\mathbf{Boundary}}$ in
Section 12). It is strongly recommended that sensible bounds are provided for all variables.
nag_glopt_bnd_pso (e05sac) may also be used to maximize the objective function (see the option ${\mathbf{Optimize}}$).
Due to the nature of global optimization, unless a predefined target is provided, there is no definitive way of knowing when to end a computation. As such several stopping heuristics have been implemented into the algorithm. If any of these is achieved, nag_glopt_bnd_pso (e05sac) will exit with
${\mathbf{fail}}\mathbf{.}\mathbf{code}=$ NW_SOLUTION_NOT_GUARANTEED, and the parameter
inform will indicate which criteria was reached. See
inform for more information.
In addition, you may provide your own stopping criteria through
monmod and
objfun.
nag_glopt_nlp_pso (e05sbc) provides a comprehensive interface, allowing for the inclusion of general nonlinear constraints.
4 References
Gill P E, Murray W and Wright M H (1981) Practical Optimization Academic Press
Kennedy J and Eberhart R C (1995) Particle Swarm Optimization Proceedings of the 1995 IEEE International Conference on Neural Networks 1942–1948
Koh B, George A D, Haftka R T and Fregly B J (2006) Parallel Asynchronous Particle Swarm Optimization International Journal for Numerical Methods in Engineering 67(4) 578–595
Vaz A I and Vicente L N (2007) A Particle Swarm Pattern Search Method for Bound Constrained Global Optimization Journal of Global Optimization 39(2) 197–219 Kluwer Academic Publishers
5 Arguments
Note: for descriptions of the symbolic variables, see
Section 11.
 1:
$\mathbf{ndim}$ – IntegerInput

On entry: $\mathit{ndim}$, the number of dimensions.
Constraint:
${\mathbf{ndim}}\ge 1$.
 2:
$\mathbf{npar}$ – IntegerInput

On entry:
$\mathit{npar}$, the number of particles to be used in the swarm. Assuming all particles remain within bounds, each complete iteration will perform at least
npar function evaluations. Otherwise, significantly fewer objective function evaluations may be performed.
Suggested value:
${\mathbf{npar}}=10\times {\mathbf{ndim}}$.
Constraint:
${\mathbf{npar}}\ge 5$.
 3:
$\mathbf{xb}\left[{\mathbf{ndim}}\right]$ – doubleOutput

On exit: the location of the best solution found, $\stackrel{~}{\mathbf{x}}$, in ${R}^{\mathit{ndim}}$.
 4:
$\mathbf{fb}$ – double *Output

On exit: the objective value of the best solution, $\stackrel{~}{f}=F\left(\stackrel{~}{\mathbf{x}}\right)$.
 5:
$\mathbf{bl}\left[{\mathbf{ndim}}\right]$ – const doubleInput
 6:
$\mathbf{bu}\left[{\mathbf{ndim}}\right]$ – const doubleInput

On entry:
${\mathbf{bl}}$ is
$\mathbf{\ell}$, the array of lower bounds,
bu is
$\mathbf{u}$, the array of upper bounds. The
ndim entries in
bl and
bu must contain the lower and upper simple (box) bounds of the variables respectively. These must be provided to initialize the sample population into a finite hypervolume, although their subsequent influence on the algorithm is user determinable (see the option
${\mathbf{Boundary}}$ in
Section 12).
If ${\mathbf{bl}}\left[i1\right]={\mathbf{bu}}\left[i1\right]$ for any $i\in \left\{1,\dots ,{\mathbf{ndim}}\right\}$, variable $i$ will remain locked to ${\mathbf{bl}}\left[i1\right]$ regardless of the ${\mathbf{Boundary}}$ option selected.
It is strongly advised that you place sensible lower and upper bounds on all variables, even if your model allows for variables to be unbounded (using the option ${\mathbf{Boundary}}=\mathrm{ignore}$) since these define the initial search space.
Constraints:
 ${\mathbf{bl}}\left[\mathit{i}1\right]\le {\mathbf{bu}}\left[\mathit{i}1\right]$, for $\mathit{i}=1,2,\dots ,{\mathbf{ndim}}$;
 ${\mathbf{bl}}\left[i1\right]\ne {\mathbf{bu}}\left[i1\right]$ for at least one $i\in \left\{1,\dots ,{\mathbf{ndim}}\right\}$.
 7:
$\mathbf{objfun}$ – function, supplied by the userExternal Function

objfun must, depending on the value of
mode, calculate the objective function
and/or calculate the gradient of the objective function for a
$\mathit{ndim}$variable vector
$\mathbf{x}$. Gradients are only required if a local minimizer has been chosen which requires gradients. See the option
${\mathbf{Local\; Minimizer}}$ for more information.
The specification of
objfun is:
 1:
$\mathbf{mode}$ – Integer *Input/Output

On entry: indicates which functionality is required.
 ${\mathbf{mode}}=0$
 $F\left(\mathbf{x}\right)$ should be returned in objf. The value of objf on entry may be used as an upper bound for the calculation. Any expected value of $F\left(\mathbf{x}\right)$ that is greater than objf may be approximated by this upper bound; that is objf can remain unaltered.
 ${\mathbf{mode}}=1$
 ${\mathbf{Local\; Minimizer}}=\mathrm{e04ucc}$ only
First derivatives can be evaluated and returned in vecout. Any unaltered elements of vecout will be approximated using finite differences.
 ${\mathbf{mode}}=2$
 ${\mathbf{Local\; Minimizer}}=\mathrm{e04ucc}$ only
$F\left(\mathbf{x}\right)$ must be calculated and returned in objf, and available first derivatives can be evaluated and returned in vecout. Any unaltered elements of vecout will be approximated using finite differences.
 ${\mathbf{mode}}=5$
 $F\left(\mathbf{x}\right)$ must be calculated and returned in objf. The value of objf on entry may not be used as an upper bound.
 ${\mathbf{mode}}=6$
 ${\mathbf{Local\; Minimizer}}=\mathrm{e04dgc}$ only
All first derivatives must be evaluated and returned in vecout.
 ${\mathbf{mode}}=7$
 ${\mathbf{Local\; Minimizer}}=\mathrm{e04dgc}$ only
$F\left(\mathbf{x}\right)$ must be calculated and returned in objf, and all first derivatives must be evaluated and returned in vecout.
On exit: if the value of
mode is set to be negative, then nag_glopt_bnd_pso (e05sac) will exit as soon as possible with
${\mathbf{fail}}\mathbf{.}\mathbf{code}=$ NE_USER_STOP and
${\mathbf{inform}}={\mathbf{mode}}$.
 2:
$\mathbf{ndim}$ – IntegerInput

On entry: the number of dimensions.
 3:
$\mathbf{x}\left[{\mathbf{ndim}}\right]$ – const doubleInput

On entry: $\mathbf{x}$, the point at which the objective function and/or its gradient are to be evaluated.
 4:
$\mathbf{objf}$ – double *Input/Output

On entry: the value of
objf passed to
objfun varies with the argument
mode.
 ${\mathbf{mode}}=0$
 objf is an upper bound for the value of $F\left(\mathbf{x}\right)$, often equal to the best value of $F\left(\mathbf{x}\right)$ found so far by a given particle. Only objective function values less than the value of objf on entry will be used further. As such this upper bound may be used to stop further evaluation when this will only increase the objective function value above the upper bound.
 ${\mathbf{mode}}=1$, $2$, $5$, $6$ or $7$
 objf is meaningless on entry.
On exit: the value of
objf returned varies with the argument
mode.
 ${\mathbf{mode}}=0$
 objf must be the value of $F\left(\mathbf{x}\right)$. Only values of $F\left(\mathbf{x}\right)$ strictly less than objf on entry need be accurate.
 ${\mathbf{mode}}=1$ or $6$
 Need not be set.
 ${\mathbf{mode}}=2$, $5$ or $7$
 $F\left(\mathbf{x}\right)$ must be calculated and returned in objf. The entry value of objf may not be used as an upper bound.
 5:
$\mathbf{vecout}\left[{\mathbf{ndim}}\right]$ – doubleInput/Output

On entry: if
${\mathbf{Local\; Minimizer}}=\mathrm{e04ucc}$, the values of
vecout are used internally to indicate whether a finite difference approximation is required. See
nag_opt_nlp (e04ucc).
On exit: the required values of
vecout returned to the calling function depend on the value of
mode.
 ${\mathbf{mode}}=0$ or $5$
 The value of vecout need not be set.
 ${\mathbf{mode}}=1$ or $2$
 vecout can contain components of the gradient of the objective function $\frac{\partial F}{\partial {x}_{i}}$ for some $i=1,2,\dots {\mathbf{ndim}}$, or acceptable approximations. Any unaltered elements of vecout will be approximated using finite differences.
 ${\mathbf{mode}}=6$ or $7$
 vecout must contain the gradient of the objective function $\frac{\partial F}{\partial {x}_{i}}$ for all $i=1,2,\dots {\mathbf{ndim}}$. Approximation of the gradient is strongly discouraged, and no finite difference approximations will be performed internally (see nag_opt_conj_grad (e04dgc)).
 6:
$\mathbf{nstate}$ – IntegerInput

On entry:
nstate indicates various stages of initialization throughout the function. This allows for permanent global arguments to be initialized the least number of times. For example, you may initialize a random number generator seed.
 ${\mathbf{nstate}}=2$
 objfun is called for the very first time. You may save computational time if certain data must be read or calculated only once.
 ${\mathbf{nstate}}=1$
 objfun is called for the first time by a NAG local minimization function. You may save computational time if certain data required for the local minimizer need only be calculated at the initial point of the local minimization.
 ${\mathbf{nstate}}=0$
 Used in all other cases.
 7:
$\mathbf{comm}$ – Nag_Comm *
Pointer to structure of type Nag_Comm; the following members are relevant to
objfun.
 user – double *
 iuser – Integer *
 p – Pointer
The type Pointer will be
void *. Before calling nag_glopt_bnd_pso (e05sac) you may allocate memory and initialize these pointers with various quantities for use by
objfun when called from nag_glopt_bnd_pso (e05sac) (see
Section 2.3.1.1 in How to Use the NAG Library and its Documentation).
 8:
$\mathbf{monmod}$ – function, supplied by the userExternal Function

A userspecified monitoring and modification function.
monmod is called once every complete iteration after a finalization check. It may be used to modify the particle locations that will be evaluated at the next iteration. This permits the incorporation of algorithmic modifications such as including additional advection heuristics and genetic mutations.
monmod is only called during the main loop of the algorithm, and as such will be unaware of any further improvement from the final local minimization. If no monitoring and/or modification is required,
monmod may be NULLFN.
The specification of
monmod is:
void 
monmod (Integer ndim,
Integer npar,
double x[],
const double xb[],
double fb,
const double xbest[],
const double fbest[],
const Integer itt[],
Nag_Comm *comm, Integer *inform)


 1:
$\mathbf{ndim}$ – IntegerInput

On entry: the number of dimensions.
 2:
$\mathbf{npar}$ – IntegerInput

On entry: the number of particles.
 3:
$\mathbf{x}\left[{\mathbf{ndim}}\times {\mathbf{npar}}\right]$ – doubleInput/Output

Note: the $i$th component of the $j$th particle, ${x}_{j}\left(i\right)$, is stored in ${\mathbf{x}}\left[\left(j1\right)\times {\mathbf{ndim}}+i1\right]$.
On entry: the
npar particle locations,
${\mathbf{x}}_{j}$, which will currently be used during the next iteration unless altered in
monmod.
On exit: the particle locations to be used during the next iteration.
 4:
$\mathbf{xb}\left[{\mathbf{ndim}}\right]$ – const doubleInput

On entry: the location, $\stackrel{~}{\mathbf{x}}$, of the best solution yet found.
 5:
$\mathbf{fb}$ – doubleInput

On entry: the objective value, $\stackrel{~}{f}=F\left(\stackrel{~}{\mathbf{x}}\right)$, of the best solution yet found.
 6:
$\mathbf{xbest}\left[{\mathbf{ndim}}\times {\mathbf{npar}}\right]$ – const doubleInput

Note: the $i$th component of the position of the $j$th particle's cognitive memory, ${\hat{x}}_{j}\left(i\right)$, is stored in ${\mathbf{xbest}}\left[\left(j1\right)\times {\mathbf{ndim}}+i1\right]$.
On entry: the locations currently in the cognitive memory,
${\hat{\mathbf{x}}}_{\mathit{j}}$, for
$\mathit{j}=1,2,\dots ,{\mathbf{npar}}$ (see
Section 11).
 7:
$\mathbf{fbest}\left[{\mathbf{npar}}\right]$ – const doubleInput

On entry: the objective values currently in the cognitive memory,
$F\left({\hat{\mathbf{x}}}_{\mathit{j}}\right)$, for $\mathit{j}=1,2,\dots ,{\mathbf{npar}}$.
 8:
$\mathbf{itt}\left[6\right]$ – const IntegerInput

On entry: iteration and function evaluation counters (see description of
itt below).
 9:
$\mathbf{comm}$ – Nag_Comm *
Pointer to structure of type Nag_Comm; the following members are relevant to
monmod.
 user – double *
 iuser – Integer *
 p – Pointer
The type Pointer will be
void *. Before calling nag_glopt_bnd_pso (e05sac) you may allocate memory and initialize these pointers with various quantities for use by
monmod when called from nag_glopt_bnd_pso (e05sac) (see
Section 2.3.1.1 in How to Use the NAG Library and its Documentation).
 10:
$\mathbf{inform}$ – Integer *Input/Output

On entry: ${\mathbf{inform}}=0$
On exit: setting
${\mathbf{inform}}<0$ will cause near immediate exit from nag_glopt_bnd_pso (e05sac). This value will be returned as
inform with
${\mathbf{fail}}\mathbf{.}\mathbf{code}=$ NE_USER_STOP. You need not set
inform unless you wish to force an exit.
 9:
$\mathbf{iopts}\left[\mathit{dim}\right]$ – IntegerCommunication Array

Note: the dimension,
$\mathit{dim}$, of this array is dictated by the requirements of associated functions that must have been previously called. This array MUST be the same array passed as argument
iopts in the previous call to
nag_glopt_opt_set (e05zkc).
On entry: optional parameter array as generated and possibly modified by calls to
nag_glopt_opt_set (e05zkc). The contents of
iopts MUST NOT be modified directly between calls to nag_glopt_bnd_pso (e05sac),
nag_glopt_opt_set (e05zkc) or
nag_glopt_opt_get (e05zlc).
 10:
$\mathbf{opts}\left[\mathit{dim}\right]$ – doubleCommunication Array

Note: the dimension,
$\mathit{dim}$, of this array is dictated by the requirements of associated functions that must have been previously called. This array MUST be the same array passed as argument
opts in the previous call to
nag_glopt_opt_set (e05zkc).
On entry: optional parameter array as generated and possibly modified by calls to
nag_glopt_opt_set (e05zkc). The contents of
opts MUST NOT be modified directly between calls to nag_glopt_bnd_pso (e05sac),
nag_glopt_opt_set (e05zkc) or
nag_glopt_opt_get (e05zlc).
 11:
$\mathbf{comm}$ – Nag_Comm *

The NAG communication argument (see
Section 2.3.1.1 in How to Use the NAG Library and its Documentation).
 12:
$\mathbf{itt}\left[6\right]$ – IntegerOutput

On exit: integer iteration counters for nag_glopt_bnd_pso (e05sac).
 ${\mathbf{itt}}\left[0\right]$
 Number of complete iterations.
 ${\mathbf{itt}}\left[1\right]$
 Number of complete iterations without improvement to the current optimum.
 ${\mathbf{itt}}\left[2\right]$
 Number of particles converged to the current optimum.
 ${\mathbf{itt}}\left[3\right]$
 Number of improvements to the optimum.
 ${\mathbf{itt}}\left[4\right]$
 Number of function evaluations performed.
 ${\mathbf{itt}}\left[5\right]$
 Number of particles reset.
 13:
$\mathbf{inform}$ – Integer *Output

On exit: indicates which finalization criterion was reached. The possible values of
inform are:
inform  Meaning 
$<0$  Exit from a usersupplied function. 
0  nag_glopt_bnd_pso (e05sac) has detected an error and terminated. 
1  The provided objective target has been achieved. (${\mathbf{Target\; Objective\; Value}}$). 
2  The standard deviation of the location of all the particles is below the set threshold (${\mathbf{Swarm\; Standard\; Deviation}}$). If the solution returned is not satisfactory, you may try setting a smaller value of ${\mathbf{Swarm\; Standard\; Deviation}}$, or try adjusting the options governing the repulsive phase (${\mathbf{Repulsion\; Initialize}}$, ${\mathbf{Repulsion\; Finalize}}$). 
3  The total number of particles converged (${\mathbf{Maximum\; Particles\; Converged}}$) to the current global optimum has reached the set limit. This is the number of particles which have moved to a distance less than ${\mathbf{Distance\; Tolerance}}$ from the optimum with regard to the ${L}^{2}$ norm. If the solution is not satisfactory, you may consider lowering the ${\mathbf{Distance\; Tolerance}}$. However, this may hinder the global search capability of the algorithm. 
4  The maximum number of iterations without improvement (${\mathbf{Maximum\; Iterations\; Static}}$) has been reached, and the required number of particles (${\mathbf{Maximum\; Iterations\; Static\; Particles}}$) have converged to the current optimum. Increasing either of these options will allow the algorithm to continue searching for longer. Alternatively if the solution is not satisfactory, restarting the application several times with ${\mathbf{Repeatability}}=\mathrm{OFF}$ may lead to an improved solution. 
5  The maximum number of iterations (${\mathbf{Maximum\; Iterations\; Completed}}$) has been reached. If the number of iterations since improvement is small, then a better solution may be found by increasing this limit, or by using the option ${\mathbf{Local\; Minimizer}}$ with corresponding exterior options. Otherwise if the solution is not satisfactory, you may try rerunning the application several times with ${\mathbf{Repeatability}}=\mathrm{OFF}$ and a lower iteration limit, or adjusting the options governing the repulsive phase (${\mathbf{Repulsion\; Initialize}}$, ${\mathbf{Repulsion\; Finalize}}$). 
6  The maximum allowed number of function evaluations (${\mathbf{Maximum\; Function\; Evaluations}}$) has been reached. As with ${\mathbf{inform}}=5$, increasing this limit if the number of iterations without improvement is small, or decreasing this limit and running the algorithm multiple times with ${\mathbf{Repeatability}}=\mathrm{OFF}$, may provide a superior result. 
 14:
$\mathbf{fail}$ – NagError *Input/Output

The NAG error argument (see
Section 2.7 in How to Use the NAG Library and its Documentation).
nag_glopt_bnd_pso (e05sac) will return
${\mathbf{fail}}\mathbf{.}\mathbf{code}=$ NE_NOERROR if and only if a finalization criterion has been reached which can guarantee success. This may only happen if the option
${\mathbf{Target\; Objective\; Value}}$ has been set and reached at a point within the search domain. The finalization criterion
${\mathbf{Target\; Objective\; Value}}$ is not activated using default option settings, and must be explicitly set using
nag_glopt_opt_set (e05zkc) if required.
nag_glopt_bnd_pso (e05sac) will return
${\mathbf{fail}}\mathbf{.}\mathbf{code}=$ NW_SOLUTION_NOT_GUARANTEED if no error has been detected, and a finalization criterion has been achieved which cannot guarantee success. This does not indicate that the function has failed, merely that the returned solution cannot be guaranteed to be the true global optimum.
The value of
inform should be examined to determine which finalization criterion was reached.
6 Error Indicators and Warnings
 NE_ALLOC_FAIL

Dynamic memory allocation failed.
See
Section 2.3.1.2 in How to Use the NAG Library and its Documentation for further information.
 NE_BAD_PARAM

On entry, argument $\u2329\mathit{\text{value}}\u232a$ had an illegal value.
 NE_BOUND

On entry, ${\mathbf{bl}}\left[i\right]={\mathbf{bu}}\left[i\right]$ for all $i$.
Constraint: ${\mathbf{bu}}\left[i\right]>{\mathbf{bl}}\left[i\right]$ for at least one $i$.
On entry, ${\mathbf{bl}}\left[\u2329\mathit{\text{value}}\u232a\right]=\u2329\mathit{\text{value}}\u232a$ and ${\mathbf{bu}}\left[\u2329\mathit{\text{value}}\u232a\right]=\u2329\mathit{\text{value}}\u232a$.
Constraint: ${\mathbf{bu}}\left[i\right]\ge {\mathbf{bl}}\left[i\right]$ for all $i$.
 NE_DERIV_ERRORS

Derivative checks indicate possible errors in the supplied derivatives.
Gradient checks may be disabled by setting ${\mathbf{Verify\; Gradients}}=\mathrm{OFF}$.
 NE_INT

On entry, ${\mathbf{ndim}}=\u2329\mathit{\text{value}}\u232a$.
Constraint: ${\mathbf{ndim}}\ge 1$.
On entry, ${\mathbf{npar}}=\u2329\mathit{\text{value}}\u232a$.
Constraint: ${\mathbf{npar}}\ge 5\times \mathbf{num\_threads}$, where num_threads is the value returned by the OpenMP environment variable OMP_NUM_THREADS, or num_threads is $1$ for a serial version of this function.
 NE_INTERNAL_ERROR

An internal error has occurred in this function. Check the function call and any array sizes. If the call is correct then please contact
NAG for assistance.
An unexpected error has been triggered by this function. Please contact
NAG.
See
Section 2.7.6 in How to Use the NAG Library and its Documentation for further information.
 NE_INVALID_OPTION

Either the option arrays have not been initialized for nag_glopt_bnd_pso (e05sac), or they have become corrupted.
 NE_NO_LICENCE

Your licence key may have expired or may not have been installed correctly.
See
Section 2.7.5 in How to Use the NAG Library and its Documentation for further information.
 NE_USER_STOP

User requested exit
$\u2329\mathit{\text{value}}\u232a$ during call to
monmod.
User requested exit
$\u2329\mathit{\text{value}}\u232a$ during call to
objfun.
 NW_FAST_SOLUTION

If the option
${\mathbf{Target\; Warning}}$ has been activated, this indicates that the
${\mathbf{Target\; Objective\; Value}}$ has been achieved to specified tolerances at a sufficiently constrained point, either during the initialization phase, or during the first two iterations of the algorithm. While this is not necessarily an error, it may occur if:
(i) 
The target was achieved at the first point sampled by the function. This will be the mean of the lower and upper bounds. 
(ii) 
The target may have been achieved at a randomly generated sample point. This will always be a possibility provided that the domain under investigation contains a point with a target objective value. 
(iii) 
If the ${\mathbf{Local\; Minimizer}}$ has been set, then a sample point may have been inside the basin of attraction of a satisfactory point. If this occurs repeatedly when the function is called, it may imply that the objective is largely unimodal, and that it may be more efficient to use the function selected as the ${\mathbf{Local\; Minimizer}}$ directly. 
Assuming that
objfun is correct, you may wish to set a better
${\mathbf{Target\; Objective\; Value}}$, or a stricter
${\mathbf{Target\; Objective\; Tolerance}}$.
 NW_SOLUTION_NOT_GUARANTEED

A finalization criterion was reached that cannot guarantee success.
On exit, ${\mathbf{inform}}=\u2329\mathit{\text{value}}\u232a$.
7 Accuracy
If
${\mathbf{fail}}\mathbf{.}\mathbf{code}=$ NE_NOERROR (or
${\mathbf{fail}}\mathbf{.}\mathbf{code}=$ NW_FAST_SOLUTION) or
${\mathbf{fail}}\mathbf{.}\mathbf{code}=$ NW_SOLUTION_NOT_GUARANTEED on exit, either a
${\mathbf{Target\; Objective\; Value}}$ or finalization criterion has been reached, depending on user selected options. As with all global optimization software, the solution achieved may not be the true global optimum. Various options allow for either greater search diversity or faster convergence to a (local) optimum (See
Sections 11 and
12).
Provided the objective function and constraints are sufficiently well behaved, if a local minimizer is used in conjunction with nag_glopt_bnd_pso (e05sac), then it is more likely that the final result will at least be in the near vicinity of a local optimum, and due to the global search characteristics of the particle swarm, this solution should be superior to many other local optima.
Caution should be used in accelerating the rate of convergence, as with faster convergence, less of the domain will remain searchable by the swarm, making it increasingly difficult for the algorithm to detect the basin of attraction of superior local optima. Using the options
${\mathbf{Repulsion\; Initialize}}$ and
${\mathbf{Repulsion\; Finalize}}$ described in
Section 12 will help to overcome this, by causing the swarm to diverge away from the current optimum once no more local improvement is likely.
On successful exit with guaranteed success, ${\mathbf{fail}}\mathbf{.}\mathbf{code}=$ NE_NOERROR. This may only happen if a ${\mathbf{Target\; Objective\; Value}}$ is assigned and is reached by the algorithm.
On successful exit without guaranteed success,
${\mathbf{fail}}\mathbf{.}\mathbf{code}=$ NW_SOLUTION_NOT_GUARANTEED is returned. This will happen if another finalization criterion is achieved without the detection of an error.
In both cases, the value of
inform provides further information as to the cause of the exit.
8 Parallelism and Performance
The code for nag_glopt_bnd_pso (e05sac) is not directly threaded for parallel execution. In particular, none of the usersupplied functions will be called from within a parallel region generated by nag_glopt_bnd_pso (e05sac).
The memory used by nag_glopt_bnd_pso (e05sac) is relatively static throughout. As such, nag_glopt_bnd_pso (e05sac) may be used in problems with high dimension number (${\mathbf{ndim}}>100$) without the concern of computational resource exhaustion, although the probability of successfully locating the global optimum will decrease dramatically with the increase in dimensionality.
Due to the stochastic nature of the algorithm, the result will vary over multiple runs. This is particularly true if arguments and options are chosen to accelerate convergence at the expense of the global search. However, the option ${\mathbf{Repeatability}}=\mathrm{ON}$ may be set to initialize the internal random number generator using a preset seed, which will result in identical solutions being obtained.
10 Example
This example uses a particle swarm to find the global minimum of the Schwefel function:
In two dimensions the optimum is ${f}_{\mathrm{min}}=837.966$, located at $\mathbf{x}=\left(420.97,420.97\right)$.
The example demonstrates how to initialize and set the options arrays using
nag_glopt_opt_set (e05zkc), how to query options using
nag_glopt_opt_get (e05zlc), and finally how to search for the global optimum using nag_glopt_bnd_pso (e05sac). The function is minimized several times to demonstrate using nag_glopt_bnd_pso (e05sac) alone, and coupled with local minimizers. This program uses the nondefault option
${\mathbf{Repeatability}}=\mathrm{ON}$ to produce repeatable solutions.
10.1 Program Text
Program Text (e05sace.c)
10.2 Program Data
None.
10.3 Program Results
Program Results (e05sace.r)
11 Algorithmic Details
The following pseudocode describes the algorithm used with the repulsion mechanism.
The definition of terms used in the above pseudocode are as follows.
$\mathit{npar}$ 
the number of particles, npar 
${\mathbf{\ell}}_{\mathrm{box}}$ 
array of ndim lower box bounds 
${\mathbf{u}}_{\mathrm{box}}$ 
array of ndim upper box bounds 
${\mathbf{x}}_{j}$ 
position of particle $j$ 
${\hat{\mathbf{x}}}_{j}$ 
best position found by particle $j$ 
$\stackrel{~}{\mathbf{x}}$ 
best position found by any particle 
${f}_{j}$ 
$F\left({\mathbf{x}}_{j}\right)$ 
${\hat{f}}_{j}$ 
$F\left({\hat{\mathbf{x}}}_{j}\right)$, best value found by particle $j$ 
$\stackrel{~}{f}$ 
$F\left(\stackrel{~}{\mathbf{x}}\right)$, best value found by any particle 
${\mathbf{v}}_{j}$ 
velocity of particle $j$ 
${w}_{j}$ 
weight on ${\mathbf{v}}_{j}$ for velocity update, decreasing according to ${\mathbf{Weight\; Decrease}}$ 
${V}_{\mathrm{max}}$ 
maximum absolute velocity, dependent upon ${\mathbf{Maximum\; Variable\; Velocity}}$ 
${I}_{c}$ 
swarm iteration counter 
${I}_{s}$ 
iterations since $\stackrel{~}{\mathbf{x}}$ was updated 
${\mathbf{D}}_{1}$,${\mathbf{D}}_{2}$ 
diagonal matrices with random elements in range $\left(0,1\right)$ 
${C}_{s}$ 
the cognitive advance coefficient which weights velocity towards ${\hat{\mathbf{x}}}_{j}$, adjusted using ${\mathbf{Advance\; Cognitive}}$ 
${C}_{g}$ 
the global advance coefficient which weights velocity towards $\stackrel{~}{\mathbf{x}}$, adjusted using ${\mathbf{Advance\; Global}}$ 
$\mathit{dtol}$ 
the ${\mathbf{Distance\; Tolerance}}$ for resetting a converged particle 
$\mathbf{R}\in U\left({\mathbf{\ell}}_{\mathrm{box}},{\mathbf{u}}_{\mathrm{box}}\right)$ 
an array of random numbers whose $i$th element is drawn from a uniform distribution in the range $\left({{\mathbf{\ell}}_{\mathrm{box}}}_{\mathit{i}},{{\mathbf{u}}_{\mathrm{box}}}_{\mathit{i}}\right)$, for $\mathit{i}=1,2,\dots ,{\mathbf{ndim}}$ 
${O}_{i}$ 
local optimizer interior options 
${O}_{e}$ 
local optimizer exterior options 
$\mathrm{LOCMIN}\left(\mathbf{x},f,O\right)$ 
apply local optimizer using the set of options $O$ using the solution $\left(\mathbf{x},f\right)$ as the starting point, if used (not default) 
monmod 
monitor progress and possibly modify ${\mathbf{x}}_{j}$ 
BOUNDARY 
apply required behaviour for ${\mathbf{x}}_{j}$ outside bounding box, (see ${\mathbf{Boundary}}$) 
new ($\stackrel{~}{f}$) 
true if $\stackrel{~}{\mathbf{x}}$, $\stackrel{~}{\mathbf{c}}$, $\stackrel{~}{f}$ were updated at this iteration 
Additionally a repulsion phase can be introduced by changing from the default values of options
${\mathbf{Repulsion\; Finalize}}$ (
${r}_{f}$),
${\mathbf{Repulsion\; Initialize}}$ (
${r}_{i}$) and
${\mathbf{Repulsion\; Particles}}$ (
${r}_{p}$). If the number of static particles is denoted
${n}_{s}$ then the following can be inserted after the new(
$\stackrel{~}{f}$) check in the pseudocode above.
12 Optional Parameters
This section can be skipped if you wish to use the default values for all optional parameters, otherwise, the following is a list of the optional parameters available and a full description of each optional parameter is provided in
Section 12.1.
12.1 Description of the Optional Parameters
For each option, we give a summary line, a description of the optional parameter and details of constraints.
The summary line contains:
 the keywords;
 a parameter value,
where the letters $a$, $i$ and $r$ denote options that take character, integer and real values respectively;
 the default value, where the symbol $\epsilon $ is a generic notation for machine precision (see nag_machine_precision (X02AJC)), and $\mathit{Imax}$ represents the largest representable integer value (see nag_max_integer (X02BBC)).
All options accept the value ‘DEFAULT’ in order to return single options to their default states.
Keywords and character values are case insensitive, however they must be separated by at least one space.
For nag_glopt_bnd_pso (e05sac) the maximum length of the argument
cvalue used by
nag_glopt_opt_get (e05zlc) is
$15$.
Advance Cognitive  $r$  Default$\text{}=2.0$ 
The cognitive advance coefficient, ${C}_{s}$. When larger than the global advance coefficient, this will cause particles to be attracted toward their previous best positions. Setting $r=0.0$ will cause nag_glopt_bnd_pso (e05sac) to act predominantly as a local optimizer. Setting $r>2.0$ may cause the swarm to diverge, and is generally inadvisable. At least one of the global and cognitive coefficients must be nonzero.
Advance Global  $r$  Default$\text{}=2.0$ 
The global advance coefficient, ${C}_{g}$. When larger than the cognitive coefficient this will encourage convergence toward the best solution yet found. Values $r\in \left(0,1\right)$ will inhibit particles overshooting the optimum. Values $r\in \left[1,2\right)$ cause particles to fly over the optimum some of the time. Larger values can prohibit convergence. Setting $r=0.0$ will remove any attraction to the current optimum, effectively generating a Monte–Carlo multistart optimization algorithm. At least one of the global and cognitive coefficients must be nonzero.
Boundary  $a$  Default$\text{}=\mathrm{FLOATING}$ 
Determines the behaviour if particles leave the domain described by the box bounds. This only affects the general PSO algorithm, and will not pass down to any NAG local minimizers chosen.
This option is only effective in those dimensions for which ${\mathbf{bl}}\left[i1\right]\ne {\mathbf{bu}}\left[i1\right]$, $i=1,2,\dots ,{\mathbf{ndim}}$.
 IGNORE
 The box bounds are ignored. The objective function is still evaluated at the new particle position.
 RESET
 The particle is reinitialized inside the domain. ${\hat{\mathbf{x}}}_{j}$ and ${\hat{f}}_{j}$ are not affected.
 FLOATING
 The particle position remains the same, however the objective function will not be evaluated at the next iteration. The particle will probably be advected back into the domain at the next advance due to attraction by the cognitive and global memory.
 HYPERSPHERICAL
 The box bounds are wrapped around an $\mathit{ndim}$dimensional hypersphere. As such a particle leaving through a lower bound will immediately reenter through the corresponding upper bound and vice versa. The standard distance between particles is also modified accordingly.
 FIXED
 The particle rests on the boundary, with the corresponding dimensional velocity set to $0.0$.
Distance Scaling  $a$  Default$\text{}=\mathrm{ON}$ 
Determines whether distances should be scaled by box widths.
 ON
 When a distance is calculated between $\mathbf{x}$ and $\mathbf{y}$, a scaled ${L}^{2}$ norm is used.
 OFF
 Distances are calculated as the standard ${L}^{2}$ norm without any rescaling.
Distance Tolerance  $r$  Default$\text{}={10}^{4}$ 
This is the distance, $\mathit{dtol}$ between particles and the global optimum which must be reached for the particle to be considered converged, i.e., that any subsequent movement of such a particle cannot significantly alter the global optimum. Once achieved the particle is reset into the box bounds to continue searching.
Constraint:
$r>0.0$.
Function Precision  $r$  Default$\text{}={\epsilon}^{0.9}$ 
The parameter defines ${\epsilon}_{r}$, which is intended to be a measure of the accuracy with which the problem function $F\left(\mathbf{x}\right)$ can be computed. If $r<\epsilon $ or $r\ge 1$, the default value is used.
The value of
${\epsilon}_{r}$ should reflect the relative precision of
$1+\leftF\left(\mathbf{x}\right)\right$; i.e.,
${\epsilon}_{r}$ acts as a relative precision when
$\leftF\right$ is large, and as an absolute precision when
$\leftF\right$ is small. For example, if
$F\left(\mathbf{x}\right)$ is typically of order
$1000$ and the first six significant digits are known to be correct, an appropriate value for
${\epsilon}_{r}$ would be
${10}^{6}$. In contrast, if
$F\left(\mathbf{x}\right)$ is typically of order
${10}^{4}$ and the first six significant digits are known to be correct, an appropriate value for
${\epsilon}_{r}$ would be
${10}^{10}$. The choice of
${\epsilon}_{r}$ can be quite complicated for badly scaled problems; see Chapter 8 of
Gill et al. (1981) for a discussion of scaling techniques. The default value is appropriate for most simple functions that are computed with full accuracy. However when the accuracy of the computed function values is known to be significantly worse than full precision, the value of
${\epsilon}_{r}$ should be large enough so that no attempt will be made to distinguish between function values that differ by less than the error inherent in the calculation.
Local Boundary Restriction  $r$  Default$\text{}=0.5$ 
Contracts the box boundaries used by a box constrained local minimizer to,
$\left[{\beta}_{l},{\beta}_{u}\right]$, containing the start point
$x$, where
Smaller values of
$r$ thereby restrict the size of the domain exposed to the local minimizer, possibly reducing the amount of work done by the local minimizer.
Constraint:
$0.0\le r\le 1.0$.
Local Interior Iterations  ${i}_{1}$  
Local Interior Major Iterations  ${i}_{1}$  
Local Exterior Iterations  ${i}_{2}$  
Local Exterior Major Iterations  ${i}_{2}$  
The maximum number of iterations or function evaluations the chosen local minimizer will perform inside (outside) the main loop if applicable. For the NAG minimizers these correspond to:
Minimizer 
Parameter/option 
Default Interior 
Default Exterior 
nag_opt_simplex_easy (e04cbc) 
maxcal 
${\mathbf{ndim}}+10$ 
$2\times {\mathbf{ndim}}+15$ 
nag_opt_conj_grad (e04dgc) 
${\mathbf{Iteration\; Limit}}$ 
$\mathrm{max}\phantom{\rule{0.125em}{0ex}}\left(30,3\times {\mathbf{ndim}}\right)$ 
$\mathrm{max}\phantom{\rule{0.125em}{0ex}}\left(50,5\times {\mathbf{ndim}}\right)$ 
nag_opt_nlp (e04ucc) 
${\mathbf{Major\; Iteration\; Limit}}$ 
$\mathrm{max}\phantom{\rule{0.125em}{0ex}}\left(10,2\times {\mathbf{ndim}}\right)$ 
$\mathrm{max}\phantom{\rule{0.125em}{0ex}}\left(30,3\times {\mathbf{ndim}}\right)$ 
Unless set, these are functions of the parameters passed to nag_glopt_bnd_pso (e05sac).
Setting $i=0$ will disable the local minimizer in the corresponding algorithmic region. For example, setting ${\mathbf{Local\; Interior\; Iterations}}=0$ and ${\mathbf{Local\; Exterior\; Iterations}}=30$ will cause the algorithm to perform no local minimizations inside the main loop of the algorithm, and a local minimization with upto $30$ iterations after the main loop has been exited.
Constraint:
${i}_{1}\ge 0$, ${i}_{2}\ge 0$.
Local Interior Tolerance  ${r}_{1}$  Default$\text{}={10}^{4}$ 
Local Exterior Tolerance  ${r}_{2}$  Default$\text{}={10}^{4}$ 
This is the tolerance provided to a local minimizer in the interior (exterior) of the main loop of the algorithm.
Constraint:
${r}_{1}>0.0$, ${r}_{2}>0.0$.
Local Interior Minor Iterations  ${i}_{1}$  
Local Exterior Minor Iterations  ${i}_{2}$  
Where applicable, the secondary number of iterations the chosen local minimizer will use inside (outside) the main loop. Currently the relevant default values are:
Minimizer 
Parameter/option 
Default Interior 
Default Exterior 
nag_opt_nlp (e04ucc) 
${\mathbf{Minor\; Iteration\; Limit}}$ 
$\mathrm{max}\phantom{\rule{0.125em}{0ex}}\left(10,2\times {\mathbf{ndim}}\right)$ 
$\mathrm{max}\phantom{\rule{0.125em}{0ex}}\left(30,3\times {\mathbf{ndim}}\right)$ 
Constraint:
${i}_{1}\ge 0$, ${i}_{2}\ge 0$.
Local Minimizer  $a$  Default$\text{}=\mathrm{OFF}$ 
Allows for a choice of
Chapter e04 functions to be used as a coupled, dedicated local minimizer.
 OFF
 No local minimization will be performed in either the INTERIOR or EXTERIOR sections of the algorithm.
 e04cbc
 Use nag_opt_simplex_easy (e04cbc) as the local minimizer. This does not require the calculation of derivatives.
On a call to
objfun during a local minimization,
${\mathbf{mode}}=5$.
 e04dgc

Use nag_opt_conj_grad (e04dgc) as the local minimizer.
Accurate derivatives must be provided, and will not be approximated internally. Additionally, each call to
objfun during a local minimization will require either the objective to be evaluated alone, or both the objective and its gradient to be evaluated. Hence on a call to
objfun,
${\mathbf{mode}}=5$ or
$7$.
 e04ucc

Use nag_opt_nlp (e04ucc) as the local minimizer.
This operates such that any derivatives of the objective function that you cannot supply, will be approximated internally using finite differences.
Either, the objective, objective gradient, or both may be requested during a local minimization, and as such on a call to
objfun,
${\mathbf{mode}}=1$,
$2$ or
$5$.
The box bounds forwarded to this function from nag_glopt_bnd_pso (e05sac) will have been acted upon by ${\mathbf{Local\; Boundary\; Restriction}}$. As such, the domain exposed may be greatly smaller than that provided to nag_glopt_bnd_pso (e05sac).
Maximum Function Evaluations  $i$  Default $=\mathit{Imax}$ 
The maximum number of evaluations of the objective function. When reached this will return
${\mathbf{fail}}\mathbf{.}\mathbf{code}=$ NW_SOLUTION_NOT_GUARANTEED and
${\mathbf{inform}}=6$.
Constraint:
$i>0$.
Maximum Iterations Completed  $i$  Default$\text{}=1000\times {\mathbf{ndim}}$ 
The maximum number of complete iterations that may be performed. Once exceeded nag_glopt_bnd_pso (e05sac) will exit with
${\mathbf{fail}}\mathbf{.}\mathbf{code}=$ NW_SOLUTION_NOT_GUARANTEED and
${\mathbf{inform}}=5$.
Unless set, this adapts to the parameters passed to nag_glopt_bnd_pso (e05sac).
Constraint:
$i\ge 1$.
Maximum Iterations Static  $i$  Default$\text{}=100$ 
The maximum number of iterations without any improvement to the current global optimum. If exceeded nag_glopt_bnd_pso (e05sac) will exit with
${\mathbf{fail}}\mathbf{.}\mathbf{code}=$ NW_SOLUTION_NOT_GUARANTEED and
${\mathbf{inform}}=4$. This exit will be hindered by setting
${\mathbf{Maximum\; Iterations\; Static\; Particles}}$ to larger values.
Constraint:
$i\ge 1$.
Maximum Iterations Static Particles  $i$  Default$\text{}=0$ 
The minimum number of particles that must have converged to the current optimum before the function may exit due to
${\mathbf{Maximum\; Iterations\; Static}}$ with
${\mathbf{fail}}\mathbf{.}\mathbf{code}=$ NW_SOLUTION_NOT_GUARANTEED and
${\mathbf{inform}}=4$.
Constraint:
$i\ge 0$.
Maximum Particles Converged  $i$  Default $=\mathit{Imax}$ 
The maximum number of particles that may converge to the current optimum. When achieved, nag_glopt_bnd_pso (e05sac) will exit with
${\mathbf{fail}}\mathbf{.}\mathbf{code}=$ NW_SOLUTION_NOT_GUARANTEED and
${\mathbf{inform}}=3$. This exit will be hindered by setting ‘
Repulsion’ options, as these cause the swarm to reexpand.
Constraint:
$i>0$.
Maximum Particles Reset  $i$  Default $=\mathit{Imax}$ 
The maximum number of particles that may be reset after converging to the current optimum. Once achieved no further particles will be reset, and any particles within ${\mathbf{Distance\; Tolerance}}$ of the global optimum will continue to evolve as normal.
Constraint:
$i>0$.
Maximum Variable Velocity  $r$  Default$\text{}=0.25$ 
Along any dimension $j$, the absolute velocity is bounded above by $\left{\mathbf{v}}_{j}\right\le r\times \left({\mathbf{u}}_{j}{\mathbf{\ell}}_{j}\right)={\mathbf{V}}_{\mathrm{max}}$. Very low values will greatly increase convergence time. There is no upper limit, although larger values will allow more particles to be advected out of the box bounds, and values greater than $4.0$ may cause significant and potentially unrecoverable swarm divergence.
Constraint:
$r>0.0$.
Optimize  $a$  Default$\text{}=\mathrm{MINIMIZE}$ 
Determines whether to maximize or minimize the objective function.
 MINIMIZE
 The objective function will be minimized.
 MAXIMIZE
 The objective function will be maximized. This is accomplished by minimizing the negative of the objective.
Repeatability  $a$  Default$\text{}=\mathrm{OFF}$ 
Allows for the same random number generator seed to be used for every call to nag_glopt_bnd_pso (e05sac).
${\mathbf{Repeatability}}=\mathrm{OFF}$ is recommended in general.
 OFF
 The internal generation of random numbers will be nonrepeatable.
 ON
 The same seed will be used.
Repulsion Finalize  $i$  Default $=\mathit{Imax}$ 
The number of iterations performed in a repulsive phase before recontraction. This allows a rediversified swarm to contract back toward the current optimum, allowing for a finer search of the near optimum space.
Constraint:
$i\ge 2$.
Repulsion Initialize  $i$  Default $=\mathit{Imax}$ 
The number of iterations without any improvement to the global optimum before the algorithm begins a repulsive phase. This phase allows the particle swarm to reexpand away from the current optimum, allowing more of the domain to be investigated. The repulsive phase is automatically ended if a superior optimum is found.
Constraint:
$i\ge 2$.
Repulsion Particles  $i$  Default$\text{}=0$ 
The number of particles required to have converged to the current optimum before any repulsive phase may be initialized. This will prevent repulsion before a satisfactory search of the near optimum area has been performed, which may happen for large dimensional problems.
Constraint:
$i\ge 0$.
Swarm Standard Deviation  $r$  Default$\text{}=0.1$ 
The target standard deviation of the particle distances from the current optimum. Once the standard deviation is below this level, nag_glopt_bnd_pso (e05sac) will exit with
${\mathbf{fail}}\mathbf{.}\mathbf{code}=$ NW_SOLUTION_NOT_GUARANTEED and
${\mathbf{inform}}=2$. This criterion will be penalized by the use of ‘
Repulsion’ options, as these cause the swarm to reexpand, increasing the standard deviation of the particle distances from the best point.
Constraint:
$r\ge 0.0$.
Target Objective  $a$  Default$\text{}=\mathrm{OFF}$ 
Target Objective Value  $r$  Default$\text{}=0.0$ 
Activate or deactivate the use of a target value as a finalization criterion. If active, then once the supplied target value for the objective function is found (beyond the first iteration if
${\mathbf{Target\; Warning}}$ is active) nag_glopt_bnd_pso (e05sac) will exit with
${\mathbf{fail}}\mathbf{.}\mathbf{code}=$ NE_NOERROR and
${\mathbf{inform}}=1$. Other than checking for feasibility only (
${\mathbf{Optimize}}=\mathrm{CONSTRAINTS}$), this is the only finalization criterion that guarantees that the algorithm has been successful. If the target value was achieved at the initialization phase or first iteration and
${\mathbf{Target\; Warning}}$ is active, nag_glopt_bnd_pso (e05sac) will exit with
${\mathbf{fail}}\mathbf{.}\mathbf{code}=$ NW_FAST_SOLUTION. This option may take any real value
$r$, or the character ON/OFF as well as DEFAULT. If this option is queried using
nag_glopt_opt_get (e05zlc), the current value of
$r$ will be returned in
rvalue, and
cvalue will indicate whether this option is ON or OFF. The behaviour of the option is as follows:
 $r$
 Once a point is found with an objective value within the ${\mathbf{Target\; Objective\; Tolerance}}$ of $r$, nag_glopt_bnd_pso (e05sac) will exit successfully with ${\mathbf{fail}}\mathbf{.}\mathbf{code}=$ NE_NOERROR and ${\mathbf{inform}}=1$.
 OFF
 The current value of $r$ will remain stored, however it will not be used as a finalization criterion.
 ON
 The current value of $r$ stored will be used as a finalization criterion.
 DEFAULT
 The stored value of $r$ will be reset to its default value ($0.0$), and this finalization criterion will be deactivated.
Target Objective Safeguard  $r$  Default$\text{}=100.0\epsilon $ 
If you have given a target objective value to reach in $\mathit{objval}$ (the value of the optional parameter ${\mathbf{Target\; Objective\; Value}}$), $\mathit{objsfg}$ sets your desired safeguarded termination tolerance, for when $\mathit{objval}$ is close to zero.
Constraint:
$\mathit{objsfg}\ge 2\epsilon $.
Target Objective Tolerance  $r$  Default$\text{}=0.0$ 
The optional tolerance to a userspecified target value.
Constraint:
$r\ge 0.0$.
Target Warning  $a$  Default$\text{}=\mathrm{OFF}$ 
Activates or deactivates the error exit associated with the target value being achieved before entry into the main loop of the algorithm,
${\mathbf{fail}}\mathbf{.}\mathbf{code}=$ NW_FAST_SOLUTION.
 OFF
 No error will be returned, and the function will exit normally.
 ON
 An error will be returned if the target objective is reached prematurely, and the function will exit with ${\mathbf{fail}}\mathbf{.}\mathbf{code}=$ NW_FAST_SOLUTION.
Verify Gradients  $a$  Default$\text{}=\mathrm{ON}$ 
Adjusts the level of gradient checking performed when gradients are required. Gradient checks are only performed on the first call to the chosen local minimizer if it requires gradients. There is no guarantee that the gradient check will be correct, as the finite differences used in the gradient check are themselves subject to inaccuracies.
 OFF
 No gradient checking will be performed.
 ON
 A cheap gradient check will be performed on both the gradients corresponding to the objective through objfun.
 OBJECTIVE
FULL
 A more expensive gradient check will be performed on the gradients corresponding to the objective objfun.
Weight Decrease  $a$  Default$\text{}=\mathrm{INTEREST}$ 
Determines how particle weights decrease.
 OFF
 Weights do not decrease.
 INTEREST
 Weights decrease through compound interest as ${w}_{\mathit{IT}+1}={w}_{\mathit{IT}}\left(1{W}_{\mathit{val}}\right)$, where ${W}_{\mathit{val}}$ is the ${\mathbf{Weight\; Value}}$ and $\mathit{IT}$ is the current number of iterations.
 LINEAR
 Weights decrease linearly following ${w}_{\mathit{IT}+1}={w}_{\mathit{IT}}\mathit{IT}\times \left({W}_{\mathit{max}}{W}_{\mathit{min}}\right)/{\mathit{IT}}_{\mathit{max}}$, where $\mathit{IT}$ is the iteration number and ${\mathit{IT}}_{\mathit{max}}$ is the maximum number of iterations as set by ${\mathbf{Maximum\; Iterations\; Completed}}$.
Weight Initial  $r$  Default$\text{}={W}_{\mathit{max}}$ 
The initial value of any particle's inertial weight, ${W}_{\mathit{ini}}$, or the minimum possible initial value if initial weights are randomized. When set, this will override ${\mathbf{Weight\; Initialize}}=\mathrm{RANDOMIZED}$ or $\mathrm{MAXIMUM}$, and as such these must be set afterwards if so desired.
Constraint:
${W}_{\mathit{min}}\le r\le {W}_{\mathit{max}}$.
Weight Initialize  $a$  Default$\text{}=\mathrm{MAXIMUM}$ 
Determines how the initial weights are distributed.
 INITIAL
 All weights are initialized at the initial weight, ${W}_{\mathit{ini}}$, if set. If ${\mathbf{Weight\; Initial}}$ has not been set, this will be the maximum weight, ${W}_{\mathit{max}}$.
 MAXIMUM
 All weights are initialized at the maximum weight, ${W}_{\mathit{max}}$.
 RANDOMIZED
 Weights are uniformly distributed in $\left({W}_{\mathit{min}},{W}_{\mathit{max}}\right)$ or $\left({W}_{\mathit{ini}},{W}_{\mathit{max}}\right)$ if ${\mathbf{Weight\; Initial}}$ has been set.
Weight Maximum  $r$  Default$\text{}=1.0$ 
The maximum particle weight, ${W}_{\mathit{max}}$.
Constraint:
$1.0\ge r\ge {W}_{\mathit{min}}$ (If ${W}_{\mathit{ini}}$ has been set then $1.0\ge r\ge {W}_{\mathit{ini}}$.)
Weight Minimum  $r$  Default$\text{}=0.1$ 
The minimum achievable weight of any particle, ${W}_{\mathit{min}}$. Once achieved, no further weight reduction is possible.
Constraint:
$0.0\le r\le {W}_{\mathit{max}}$ (If ${W}_{\mathit{ini}}$ has been set then $0.0\le r\le {W}_{\mathit{ini}}$.)
Weight Reset  $a$  Default$\text{}=\mathrm{MAXIMUM}$ 
Determines how particle weights are reinitialized.
 INITIAL
 Weights are reinitialized at the initial weight if set. If ${\mathbf{Weight\; Initial}}$ has not been set, this will be the maximum weight.
 MAXIMUM
 Weights are reinitialized at the maximum weight.
 RANDOMIZED
 Weights are uniformly distributed in $\left({W}_{\mathit{min}},{W}_{\mathit{max}}\right)$ or $\left({W}_{\mathit{ini}},{W}_{\mathit{max}}\right)$ if ${\mathbf{Weight\; Initial}}$ has been set.
Weight Value  $r$  Default$\text{}=0.01$ 
The constant ${W}_{\mathit{val}}$ used with ${\mathbf{Weight\; Decrease}}=\mathrm{INTEREST}$.
Constraint:
$0.0\le r\le \frac{1}{3}$.