NAG CL Interface
e05jbc (bnd_​mcs_​solve)

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.
Settings help

CL Name Style:


1 Purpose

e05jbc is designed to find the global minimum or maximum of an arbitrary function, subject to simple bound-constraints using a multi-level coordinate search method. Derivatives are not required, but convergence is only guaranteed if the objective function is continuous in a neighbourhood of a global optimum. It is not intended for large problems.
The initialization function e05jac must have been called before calling e05jbc.

2 Specification

#include <nag.h>
void  e05jbc (Integer n,
void (*objfun)(Integer n, const double x[], double *f, Integer nstate, Nag_Comm *comm, Integer *inform),
Nag_BoundType bound, Nag_MCSInitMethod initmethod, double bl[], double bu[], Integer sdlist, double list[], Integer numpts[], Integer initpt[],
void (*monit)(Integer n, Integer ncall, const double xbest[], const Integer icount[], Integer ninit, const double list[], const Integer numpts[], const Integer initpt[], Integer nbaskt, const double xbaskt[], const double boxl[], const double boxu[], Integer nstate, Nag_Comm *comm, Integer *inform),
double x[], double *obj, Nag_E05State *state, Nag_Comm *comm, NagError *fail)
The function may be called by the names: e05jbc or nag_glopt_bnd_mcs_solve.
e05jac must be called before calling e05jbc, or any of the option-setting or option-getting functions:
You must not alter the number of non-fixed variables in your problem or the contents of state between calls of the functions:

3 Description

e05jbc is designed to solve modestly sized global optimization problems having simple bound-constraints only; it finds the global optimum of a nonlinear function subject to a set of bound constraints on the variables. Without loss of generality, the problem is assumed to be stated in the following form:
minimize xRn F(x)   subject to   x u   and   u ,  
where F(x) (the objective function) is a nonlinear scalar function (assumed to be continuous in a neighbourhood of a global minimum), and the bound vectors are elements of R¯n, where R¯ denotes the extended reals R{-,}. Relational operators between vectors are interpreted elementwise.
The optional parameter Maximize should be set if you wish to solve maximization, rather than minimization, problems.
If certain bounds are not present, the associated elements of or u can be set to special values that will be treated as - or +. See the description of the optional parameter Infinite Bound Size. Phrases in this document containing terms like ‘unbounded values’ should be understood to be taken relative to this optional parameter.
Fixing variables (that is, setting li=ui for some i) is allowed in e05jbc.
A typical excerpt from a function calling e05jbc is:
nag_glopt_bnd_mcs_init(n_r, &state, ...);
nag_glopt_bnd_mcs_optset_string(optstr, &state, ...);
nag_glopt_bnd_mcs_solve(n, objfun, ...);
where e05jdc sets the optional parameter and value specified in optstr.
The initialization function e05jac does not need to be called before each invocation of e05jbc. You should be aware that a call to the initialization function will reset each optional parameter to its default value, and, if you are using repeatable randomized initialization lists (see the description of the argument initmethod), the random state stored in state will be destroyed.
You must supply a function that evaluates F(x); derivatives are not required.
The method used by e05jbc is based on MCS, the Multi-level Coordinate Search method described in Huyer and Neumaier (1999), and the algorithm it uses is described in detail in Section 11.

4 References

Huyer W and Neumaier A (1999) Global optimization by multi-level coordinate search Journal of Global Optimization 14 331–355

5 Arguments

Note: for convenience the subarray notation a(i:j,k:l), as described in Section 3.1.4 in the Introduction to the NAG Library CL Interface, is used. Using this notation, the term ‘column index’ refers to the index j in LIST(i,j), say (see list for the definition of LIST).
1: n Integer Input
On entry: n, the number of variables.
Constraint: n>0.
2: objfun function, supplied by the user External Function
objfun must evaluate the objective function F(x) for a specified n-vector x.
The specification of objfun is:
void  objfun (Integer n, const double x[], double *f, Integer nstate, Nag_Comm *comm, Integer *inform)
1: n Integer Input
On entry: n, the number of variables.
2: x[n] const double Input
On entry: x, the vector at which the objective function is to be evaluated.
3: f double * Output
On exit: must be set to the value of the objective function at x.
4: nstate Integer Input
On entry: if nstate=1 then e05jbc is calling objfun for the first time. This argument setting allows you to save computation time if certain data must be read or calculated only once.
5: comm Nag_Comm *
Pointer to structure of type Nag_Comm; the following members are relevant to objfun.
userdouble *
iuserInteger *
pPointer 
The type Pointer will be void *. Before calling e05jbc you may allocate memory and initialize these pointers with various quantities for use by objfun when called from e05jbc (see Section 3.1.1 in the Introduction to the NAG Library CL Interface).
6: inform Integer * Output
On exit: must be set to a value describing the action to be taken by the solver on return from objfun. Specifically, if the value is negative the solution of the current problem will terminate immediately; otherwise, computations will continue.
Note: objfun should not return floating-point NaN (Not a Number) or infinity values, since these are not handled by e05jbc. If your code inadvertently does return any NaNs or infinities, e05jbc is likely to produce unexpected results.
3: bound Nag_BoundType Input
On entry: indicates whether the facility for dealing with bounds of special forms is to be used. bound must be set to one of the following values.
bound=Nag_Bounds
You will supply and u individually.
bound=Nag_NoBounds
There are no bounds on x.
bound=Nag_BoundsZero
There are semi-infinite bounds 0x.
bound=Nag_BoundsEqual
There are constant bounds =1 and u=u1.
Note that it only makes sense to fix any components of x when bound=Nag_Bounds.
Constraint: bound=Nag_Bounds, Nag_NoBounds, Nag_BoundsZero or Nag_BoundsEqual.
4: initmethod Nag_MCSInitMethod Input
On entry: selects which initialization method to use.
initmethod=Nag_SimpleBdry
Simple initialization (boundary and midpoint), with
numpts[i-1]=3 , initpt[i-1]=2 and
LIST(i,1) = bl[i-1], LIST(i,2) = (bl[i-1]+bu[i-1]) / 2, LIST(i,3) = bu[i-1],
for i=1,2,,n .
initmethod=Nag_SimpleOffBdry
Simple initialization (off-boundary and midpoint), with
numpts[i-1]=3 , initpt[i-1]=2 and
LIST(i,1) = (5bl[i-1]+bu[i-1]) / 6, LIST(i,2) = (bl[i-1]+bu[i-1]) / 2, LIST(i,3) = (bl[i-1]+5bu[i-1]) / 6,
for i=1,2,,n .
initmethod=Nag_Linesearch
Initialization using linesearches.
initmethod=Nag_UserSet
You are providing your own initialization list.
initmethod=Nag_Random
Generate a random initialization list.
See list for the definition of LIST.
For more information on methods initmethod=Nag_Linesearch, Nag_UserSet or Nag_Random see Section 11.1.
If ‘infinite’ values (as determined by the value of the optional parameter Infinite Bound Size) are detected by e05jbc when you are using a simple initialization method (initmethod=Nag_SimpleBdry or Nag_SimpleOffBdry), a safeguarded initialization procedure will be attempted, to avoid overflow.
Suggested value: initmethod=Nag_SimpleBdry.
Constraint: initmethod=Nag_SimpleBdry, Nag_SimpleOffBdry, Nag_Linesearch, Nag_UserSet or Nag_Random.
5: bl[n] double Input/Output
6: bu[n] double Input/Output
On entry: bl is , the array of lower bounds. bu is u, the array of upper bounds.
If bound=Nag_Bounds, you must set bl[i-1] to i and bu[i-1] to ui, for i=1,2,,n. If a particular xi is to be unbounded below, the corresponding bl[i-1] should be set to -infbnd, where infbnd is the value of the optional parameter Infinite Bound Size. Similarly, if a particular xi is to be unbounded above, the corresponding bu[i-1] should be set to infbnd.
If bound=Nag_NoBounds or Nag_BoundsZero, arrays bl and bu need not be set on input.
If bound=Nag_BoundsEqual, you must set bl[0] to 1 and bu[0] to u1. The remaining elements of bl and bu will then be populated by these initial values.
On exit: unless fail.code= NE_INT, NE_INT_2, NE_NOT_INIT, NE_REAL or NE_REAL_2 on exit, bl and bu are the actual arrays of bounds used by e05jbc.
Constraints:
  • if bound=Nag_Bounds, bl[i-1]bu[i-1], for i=1,2,,n;
  • if bound=Nag_BoundsEqual, bl[0]<bu[0].
7: sdlist Integer Input
On entry: the first dimension of the array LIST. must be set to, at least, the maximum over i of the number of points in coordinate i at which to split according to the initialization list list; that is, sdlistmaxinumpts[i-1].
Internally, e05jbc uses list to determine sets of points along each coordinate direction to which it fits quadratic interpolants. Since fitting a quadratic requires at least three distinct points, this puts a lower bound on sdlist. Furthermore, in the case of initialization by linesearches (initmethod=Nag_Linesearch) internal storage considerations require that sdlist be at least 192.
8: list[n×sdlist] double Input/Output
Note: where LIST(i,j) appears in this document, it refers to the array element list[(i-1)×sdlist+j-1].
for convenience the subarray notation list(i:j,k:l), as described in Section 3.1.4 in the Introduction to the NAG Library CL Interface, is used. Using this notation, the term ‘column index’ refers to the index j in LIST(i,j), say.
On entry: this argument need not be set on entry if you wish to use one of the preset initialization methods (initmethodNag_UserSet).
list is the ‘initialization list’: whenever a sub-box in the algorithm is split for the first time (either during the initialization procedure or later), for each non-fixed coordinate i the split is done at the values LIST(i,1:numpts[i-1]), as well as at some adaptively chosen intermediate points. The array sections LIST(i,1:numpts[i-1]) , for i=1,2,,n, must be in ascending order with each entry being distinct. In this context, ‘distinct’ should be taken to mean relative to the safe-range parameter (see X02AMC).
On exit: unless fail.code= NE_ALLOC_FAIL, NE_INT, NE_INT_2, NE_NOT_INIT, NE_REAL or NE_REAL_2 on exit, the actual initialization data used by e05jbc. If you wish to monitor the contents of list you are advised to do so solely through monit, not through the output value here.
Constraints:
if x[i-1] is not fixed,
  • LIST(i,1:numpts[i-1]) is in ascending order with each entry being distinct, for i=1,2,,n;
  • bl[i-1]LIST(i,j)bu[i-1], for i=1,2,,n and j=1,2,,numpts[i-1].
9: numpts[n] Integer Input/Output
On entry: this argument need not be set on entry if you wish to use one of the preset initialization methods (initmethodNag_UserSet).
numpts encodes the number of splitting points in each non-fixed dimension.
On exit: unless fail.code= NE_ALLOC_FAIL, NE_INT, NE_INT_2, NE_NOT_INIT, NE_REAL or NE_REAL_2 on exit, the actual initialization data used by e05jbc.
Constraints:
  • if x[i-1] is not fixed, numpts[i-1] sdlist ;
  • numpts[i-1] 3 , for i=1,2,,n.
10: initpt[n] Integer Input/Output
On entry: this argument need not be set on entry if you wish to use one of the preset initialization methods (initmethodNag_UserSet).
You must designate a point stored in list that you wish e05jbc to consider as an ‘initial point’ for the purposes of the splitting procedure. Call this initial point x*. The coordinates of x* correspond to a set of indices Ji, for i=1,2,,n, such that xi* is stored in LIST(i,Ji) , for i=1,2,,n. You must set initpt[i-1] = Ji , for i=1,2,,n.
On exit: unless fail.code= NE_ALLOC_FAIL, NE_INT, NE_INT_2, NE_NOT_INIT, NE_REAL or NE_REAL_2 on exit, the actual initialization data used by e05jbc.
Constraint: if x[i-1] is not fixed, 1 initpt[i-1] sdlist , for i=1,2,,n.
11: monit function, supplied by the user External Function
monit may be used to monitor the optimization process. It is invoked upon every successful completion of the procedure in which a sub-box is considered for splitting. It will also be called just before e05jbc exits if that splitting procedure was not successful.
If no monitoring is required, monit may be specified as NULLFN.
The specification of monit is:
void  monit (Integer n, Integer ncall, const double xbest[], const Integer icount[], Integer ninit, const double list[], const Integer numpts[], const Integer initpt[], Integer nbaskt, const double xbaskt[], const double boxl[], const double boxu[], Integer nstate, Nag_Comm *comm, Integer *inform)
1: n Integer Input
On entry: n, the number of variables.
2: ncall Integer Input
On entry: the cumulative number of calls to objfun.
3: xbest[n] const double Input
On entry: the current best point.
4: icount[6] const Integer Input
On entry: an array of counters.
icount[0]
nboxes, the current number of sub-boxes.
icount[1]
ncloc, the cumulative number of calls to objfun made in local searches.
icount[2]
nloc, the cumulative number of points used as start points for local searches.
icount[3]
nsweep, the cumulative number of sweeps through levels.
icount[4]
m, the cumulative number of splits by initialization list.
icount[5]
s, the current lowest level containing non-split boxes.
5: ninit Integer Input
On entry: the maximum over i of the number of points in coordinate i at which to split according to the initialization list list. See also the description of the argument numpts.
6: list[n×ninit] const double Input
On entry: the initialization list.
7: numpts[n] const Integer Input
On entry: the number of points in each coordinate at which to split according to the initialization list list.
8: initpt[n] const Integer Input
On entry: a pointer to the ‘initial point’ in list. Element initpt[i-1] is the column index in LIST of the ith coordinate of the initial point.
9: nbaskt Integer Input
On entry: the number of points in the ‘shopping basket’ xbaskt.
10: xbaskt[n×nbaskt] const double Input
Note: the jth candidate minimum has its ith coordinate stored in xbaskt[(j-1)×nbaskt+i-1], for i=1,2,,n and j=1,2,,nbaskt.
On entry: the ‘shopping basket’ of candidate minima.
11: boxl[n] const double Input
On entry: the array of lower bounds of the current search box.
12: boxu[n] const double Input
On entry: the array of upper bounds of the current search box.
13: nstate Integer Input
On entry: is set by e05jbc to indicate at what stage of the minimization monit was called.
nstate=1
This is the first time that monit has been called.
nstate=−1
This is the last time monit will be called.
nstate=0
This is the first and last time monit will be called.
14: comm Nag_Comm *
Pointer to structure of type Nag_Comm; the following members are relevant to monit.
userdouble *
iuserInteger *
pPointer 
The type Pointer will be void *. Before calling e05jbc you may allocate memory and initialize these pointers with various quantities for use by monit when called from e05jbc (see Section 3.1.1 in the Introduction to the NAG Library CL Interface).
15: inform Integer * Output
On exit: must be set to a value describing the action to be taken by the solver on return from monit. Specifically, if the value is negative the solution of the current problem will terminate immediately; otherwise, computations will continue.
12: x[n] double Output
On exit: if fail.code= NE_NOERROR, contains an estimate of the global optimum (see also Section 7).
13: obj double * Output
On exit: if fail.code= NE_NOERROR, contains the function value at x.
If you request early termination of e05jbc in objfun or monit, there is no guarantee that the function value at x equals obj.
14: state Nag_E05State * Communication Structure
state contains information required by other functions in this suite. You must not modify it directly in any way.
15: comm Nag_Comm *
The NAG communication argument (see Section 3.1.1 in the Introduction to the NAG Library CL Interface).
16: fail NagError * Input/Output
The NAG error argument (see Section 7 in the Introduction to the NAG Library CL Interface).
e05jbc returns with fail.code= NE_NOERROR if your termination criterion has been met: either a target value has been found to the required relative error (as determined by the values of the optional parameters Target Objective Value, Target Objective Error and Target Objective Safeguard), or the best function value was static for the number of sweeps through levels given by the optional parameter Static Limit. The latter criterion is the default.

6 Error Indicators and Warnings

NE_ALLOC_FAIL
Dynamic memory allocation failed.
See Section 3.1.2 in the Introduction to the NAG Library CL Interface for further information.
NE_BAD_PARAM
On entry, argument value had an illegal value.
NE_DIV_COMPLETE
The division procedure completed but your target value could not be reached.
Despite every sub-box being processed Splits Limit times, the target value you provided in Target Objective Value could not be found to the tolerances given in Target Objective Error and Target Objective Safeguard. You could try reducing Splits Limit or the objective tolerances.
NE_INF_INIT_LIST
A finite initialization list could not be computed internally. Consider reformulating the bounds on the problem, try providing your own initialization list, use the randomization option (initmethod=Nag_Random) or vary the value of Infinite Bound Size.
The user-supplied initialization list contained infinite values, as determined by the optional parameter Infinite Bound Size.
NE_INLIST_CLOSE
An error occurred during initialization. It is likely that points from the initialization list are very close together. Try relaxing the bounds on the variables or use a different initialization method.
NE_INT
On entry, initmethod=Nag_Linesearch and sdlist=value.
Constraint: if initmethod=Nag_Linesearch then sdlist192.
On entry, initmethod=value and sdlist=value.
Constraint: if initmethodNag_Linesearch then sdlist3.
On entry, n=value.
Constraint: n>0.
On entry, user-supplied section LIST(i,1:numpts[i-1]) contained ndist distinct elements, and ndist<numpts[i-1]: ndist=value, numpts[i-1]=value, i=value.
The number of non-fixed variables nr=0.
Constraint: nr>0.
NE_INT_2
A value of Splits Limit (smax) smaller than nr+3 was set: smax=value, nr=value.
On entry, user-supplied initpt[i-1]=value, i=value.
Constraint: if x[i-1] is not fixed then initpt[i-1]1, for i=1,2,,n.
On entry, user-supplied initpt[i-1]=value, i=value and sdlist=value.
Constraint: if x[i-1] is not fixed then initpt[i-1] sdlist , for i=1,2,,n.
On entry, user-supplied numpts[i-1]=value, i=value.
Constraint: if x[i-1] is not fixed then numpts[i-1]3, for i=1,2,,n.
On entry, user-supplied numpts[i-1]=value, i=value and sdlist=value.
Constraint: if x[i-1] is not fixed then numpts[i-1]sdlist, for i=1,2,,n.
On entry, user-supplied section LIST(i,1:numpts[i-1]) was not in ascending order: numpts[i-1]=value, i=value.
NE_INT_ARRAY
On entry, numpts[value]=value.
Constraint: numpts[i-1] 3 , for i=1,2,,n..
On entry, x[value]=value.
Constraint: if x[i-1] is not fixed, numpts[i-1] sdlist .
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.
See Section 7.5 in the Introduction to the NAG Library CL Interface for further information.
NE_LINESEARCH_ERROR
An error occurred during linesearching. It is likely that your objective function is badly scaled: try rescaling it. Also, try relaxing the bounds or use a different initialization method. If the problem persists, please contact NAG quoting error code value.
NE_MONIT_TERMIN
User-supplied monitoring function requested termination.
NE_NO_LICENCE
Your licence key may have expired or may not have been installed correctly.
See Section 8 in the Introduction to the NAG Library CL Interface for further information.
NE_NOT_INIT
Initialization function e05jac has not been called.
NE_OBJFUN_TERMIN
User-supplied objective function requested termination.
NE_REAL
On entry, bound=Nag_BoundsEqual and bl[0]=bu[0]=value.
Constraint: if bound=Nag_BoundsEqual then bl[0]<bu[0].
NE_REAL_2
On entry, bound=Nag_Bounds or Nag_BoundsEqual and bl[i-1]=value, bu[i-1]=value and i=value.
Constraint: if bound=Nag_Bounds then bl[i-1] bu[i-1] , for i=1,2,,n; if bound=Nag_BoundsEqual then bl[0]<bu[0].
On entry, user-supplied LIST(i,j)=value, i=value, j=value, and bl[i-1]=value.
Constraint: if x[i-1] is not fixed then LIST(i,j) bl[i-1] , for i=1,2,,n and j=1,2,,numpts[i-1].
On entry, user-supplied LIST(i,j)=value, i=value, j=value, and bu[i-1]=value.
Constraint: if x[i-1] is not fixed then LIST(i,j) bu[i-1] , for i=1,2,,n and j=1,2,,numpts[i-1].
NE_TOO_MANY_FEVALS
The function evaluations limit was exceeded.
Approximately Function Evaluations Limit function calls have been made without your chosen termination criterion being satisfied.

7 Accuracy

If fail.code= NE_NOERROR on exit, then the vector returned in the array x is an estimate of the solution x whose function value satisfies your termination criterion: the function value was static for Static Limit sweeps through levels, or
F(x) - objval max( objerr × |objval| ,objsfg) ,  
where objval is the value of the optional parameter Target Objective Value, objerr is the value of the optional parameter Target Objective Error, and objsfg is the value of the optional parameter Target Objective Safeguard.

8 Parallelism and Performance

e05jbc is threaded by NAG for parallel execution in multithreaded implementations of the NAG Library.
e05jbc makes calls to BLAS and/or LAPACK routines, which may be threaded within the vendor library used by this implementation. Consult the documentation for the vendor library for further information.
Please consult the X06 Chapter Introduction for information on how to control and interrogate the OpenMP environment used within this function. Please also consult the Users' Note for your implementation for any additional implementation-specific information.

9 Further Comments

For each invocation of e05jbc, local workspace arrays of fixed length are allocated internally. The total size of these arrays amounts to 13nr+smax-1 Integer elements, where smax is the value of the optional parameter Splits Limit and nr is the number of non-fixed variables, and (2+nr)sdlist+2n+22nr+3nr2+1 double elements. In addition, if you are using randomized initialization lists (see the description of the argument initmethod), a further 21 Integer elements are allocated internally.
In order to keep track of the regions of the search space that have been visited while looking for a global optimum, e05jbc internally allocates arrays of increasing sizes depending on the difficulty of the problem. Two of the main factors that govern the amount allocated are the number of sub-boxes (call this quantity nboxes) and the number of points in the ‘shopping basket’ (the argument nbaskt on entry to monit). Safe, pessimistic upper bounds on these two quantities are so large as to be impractical. In fact, the worst-case number of sub-boxes for even the most simple initialization list (when ninit=3 on entry to monit) grows like nr nr. Thus e05jbc does not attempt to estimate in advance the final values of nboxes or nbaskt for a given problem. There are a total of 5 Integer arrays and 4+nr+ninit double arrays whose lengths depend on nboxes, and there are a total of 2 Integer arrays and 3+n+nr double arrays whose lengths depend on nbaskt. e05jbc makes a fixed initial guess that the maximum number of sub-boxes required will be 10000 and that the maximum number of points in the ‘shopping basket’ will be 1000. If ever a greater amount of sub-boxes or more room in the ‘shopping basket’ is required, e05jbc performs reallocation, usually doubling the size of the inadequately-sized arrays. Clearly this process requires periods where the original array and its extension exist in memory simultaneously, so that the data within can be copied, which compounds the complexity of e05jbc's memory usage. It is possible (although not likely) that if your problem is particularly difficult to solve, or of a large size (hundreds of variables), you may run out of memory.
One array that could be dynamically resized by e05jbc is the ‘shopping basket’ (xbaskt on entry to monit). If the initial attempt to allocate 1000nr doubles for this array fails, monit will not be called on exit from e05jbc.
e05jbc performs better if your problem is well-scaled. It is worth trying (by guesswork perhaps) to rescale the problem if necessary, as sensible scaling will reduce the difficulty of the optimization problem, so that e05jbc will take less computer time.

10 Example

This example finds the global minimum of the ‘peaks’ function in two dimensions
F(x,y) = 3 (1-x) 2 exp(- x 2 - (y+1) 2 ) -10 ( x 5 - x 3 - y 5 ) exp(- x 2 - y 2 ) - 1 3 exp(- (x+1) 2 - y 2 )  
on the box [−3,3] × [−3,3] .
The function F has several local minima and one global minimum in the given box. The global minimum is approximately located at (0.23,-1.63) , where the function value is approximately -6.55.
We use default values for all the optional parameters, and we instruct e05jbc to use the simple initialization list corresponding to initmethod=Nag_SimpleBdry. In particular, this will set for us the initial point (0,0) (see Section 10.3).

10.1 Program Text

Program Text (e05jbce.c)

10.2 Program Data

Program Data (e05jbce.d)

10.3 Program Results

Program Results (e05jbce.r)
GnuplotProduced by GNUPLOT 4.6 patchlevel 3 −3 −2 −1 0 1 2 3 −3 −2 −1 0 1 2 3 Example Program The Peaks Function F and Search Boxes The global minimum is denoted by GM, while our start point is labelled with X GM X gnuplot_plot_1 gnuplot_plot_2 gnuplot_plot_3 gnuplot_plot_4 gnuplot_plot_5 gnuplot_plot_6 gnuplot_plot_7 gnuplot_plot_8 gnuplot_plot_9 gnuplot_plot_10 gnuplot_plot_11 gnuplot_plot_12 gnuplot_plot_13 gnuplot_plot_14
Note: the remainder of this document is intended for more advanced users. Section 11 contains a detailed description of the algorithm. This information may be needed in order to understand Section 12, which describes the optional parameters that can be set by calls to e05jcc, e05jdc, e05jec, e05jfc and/or e05jgc.

11 Algorithmic Details

Here we summarise the main features of the MCS algorithm used in e05jbc, and we introduce some terminology used in the description of the function and its arguments. We assume throughout that we will only do any work in coordinates i in which xi is free to vary. The MCS algorithm is fully described in Huyer and Neumaier (1999).

11.1 Initialization and Sweeps

Each sub-box is determined by a basepoint x and an opposite point y. We denote such a sub-box by B[x,y]. The basepoint is allowed to belong to more than one sub-box, is usually a boundary point, and is often a vertex.
An initialization procedure produces an initial set of sub-boxes. Whenever a sub-box is split along a coordinate i for the first time (in the initialization procedure or later), the splitting is done at three or more user-defined values {xij}j at which the objective function is sampled, and at some adaptively chosen intermediate points. At least four children are generated. More precisely, we assume that we are given
i xi1 < xi2 < < xiLi ui ,  Li 3 ,  for ​ i=1,2,,n  
and a vector p that, for each i, locates within {xij}j the ith coordinate of an initial point x0; that is, if xi0=xij for some j=1,2,,Li, then pi=j. A good guess for the global optimum can be used as x0.
The initialization points and the vectors and p are collectively called the initialization list (and sometimes we will refer to just the initialization points as ‘the initialization list’, whenever this causes no confusion). The initialization data may be input by you, or they can be set to sensible default values by e05jbc: if you provide them yourself, LIST(i,j) should contain xij, numpts[i-1] should contain Li, and initpt[i-1] should contain pi, for i=1,2,,n and j=1,2,,Li; if you wish e05jbc to use one of its preset initialization methods, you could choose one of two simple, three-point methods (see Figure 1). If the list generated by one of these methods contains infinite values, attempts are made to generate a safeguarded list using the function subint(x,y) (which is also used during the splitting procedure, and is described in Section 11.2). If infinite values persist, e05jbc exits with fail.code= NE_INF_INIT_LIST. There is also the option to generate an initialization list with the aid of linesearches (by setting initmethod=Nag_Linesearch). Starting with the absolutely smallest point in the root box, linesearches are made along each coordinate. For each coordinate, the local minimizers found by the linesearches are put into the initialization list. If there were fewer than three minimizers, they are augmented by close-by values. The final preset initialization option (initmethod=Nag_Random) generates a randomized list, so that independent multiple runs may be made if you suspect a global optimum has not been found. Each call to the initialization function e05jac resets the initial-state vector for the Wichmann–Hill base-generator that is used. Depending on whether you set the optional parameter Repeatability to ON or OFF, the random state is initialized to give a repeatable or non-repeatable sequence. Then, a random integer between 3 and sdlist is selected, which is then used to determine the number of points to be generated in each coordinate; that is, numpts becomes a constant vector, set to this value. The components of list are then generated, from a uniform distribution on the root box if the box is finite, or else in a safeguarded fashion if any bound is infinite. The array initpt is set to point to the best point in list.
Given an initialization list (preset or otherwise), e05jbc evaluates F at x0, and sets the initial estimate of the global minimum, x*, to x0. Then, for i=1,2,,n, the objective function F is evaluated at Li-1 points that agree with x* in all but the ith coordinate. We obtain pairs ( x^ j , f i j ) , for j=1,2,,Li, with: x*=x^j1, say; with, for jj1,
x^kj = { xk* if ​ki; xkj otherwise;  
and with
fij = F ( x^ j ) .  
The point having the smallest function value is renamed x* and the procedure is repeated with the next coordinate.
Once e05jbc has a full set of initialization points and function values, it can generate an initial set of sub-boxes. Recall that the root box is B[x,y]=[,u], having basepoint x=x0. The opposite point y is a corner of [,u] farthest away from x, in some sense. The point x need not be a vertex of [,u], and y is entitled to have infinite coordinates. We loop over each coordinate i, splitting the current box along coordinate i into 2Li-2, 2Li-1 or 2Li sub-intervals with exactly one of the x^ij as endpoints, depending on whether two, one or none of the x^ij are on the boundary. Thus, as well as splitting at x^ i j , for j=1,2,,Li, we split at additional points z i j , for j=2,3,,Li. These additional zij are such that
zij = x^ i j-1 + qm ( x^ i j - x^ i j-1 ) ,   j=2,,Li ,  
where q is the golden-section ratio (5-1)/2, and the exponent m takes the value 1 or 2, chosen so that the sub-box with the smaller function value gets the larger fraction of the interval. Each child sub-box gets as basepoint the point obtained from x* by changing xi* to the xij that is a boundary point of the corresponding ith coordinate interval; this new basepoint, therefore, has function value fij. The opposite point is derived from y by changing yi to the other end of that interval.
e05jbc can now rank the coordinates based on an estimated variability of F. For each i we compute the union of the ranges of the quadratic interpolant through any three consecutive x^ij, taking the difference between the upper and lower bounds obtained as a measure of the variability of F in coordinate i. A vector π is populated in such a way that coordinate i has the πith highest estimated variability. For tiebreaks, when the x* obtained after splitting coordinate i belongs to two sub-boxes, the one that contains the minimizer of the quadratic models is designated the current sub-box for coordinate i+1.
Boxes are assigned levels in the following manner. The root box is given level 1. When a sub-box of level s is split, the child with the smaller fraction of the golden-section split receives level s+2; all other children receive level s+1. The box with the better function value is given the larger fraction of the splitting interval and the smaller level because then it is more likely to be split again more quickly. We see that after the initialization procedure the first level is empty and the non-split boxes have levels 2,,nr+2, so it is meaningful to choose smax much larger than nr. Note that the internal structure of e05jbc demands that smax be at least nr+3.
Examples of initializations in two dimensions are given in Figure 1. In both cases the initial point is x0=(+u)/2; on the left the initialization points are
x1 = ,  x2 = (+u) / 2 ,  x3 = u ,  
while on the right the points are
x1 = (5+u) / 6 ,  x2 = (+u) / 2 ,  x3 = (+5u) / 6 .  
In Figure 1, basepoints and levels after initialization are displayed. Note that these initialization lists correspond to initmethod=Nag_SimpleBdry and initmethod=Nag_SimpleOffBdry, respectively.
Examples of the initialization procedure
Figure 1: Examples of the initialization procedure
After initialization, a series of sweeps through levels is begun. A sweep is defined by three steps:
  1. (i)scan the list of non-split sub-boxes. Fill a record list b according to bs=0 if there is no box at level s, and with bs pointing to a sub-box with the lowest function value among all sub-boxes with level s otherwise, for 0<s<smax;
  2. (ii)the sub-box with label bs is a candidate for splitting. If the sub-box is not to be split, according to the rules described in Section 11.2, increase its level by 1 and update bs+1 if necessary. If the sub-box is split, mark it so, insert its children into the list of sub-boxes, and update b if any child with level s yields a strict improvement of F over those sub-boxes at level s;
  3. (iii)increment s by 1. If s=smax then displaying monitoring information and start a new sweep; else if bs=0 then repeat this step; else display monitoring information and go to the previous step.
Clearly, each sweep ends after at most smax-1 visits of the third step.

11.2 Splitting

Each sub-box is stored by e05jbc as a set of information about the history of the sub-box: the label of its parent, a label identifying which child of the parent it is, etc. Whenever a sub-box B[x,y] of level s<smax is a candidate for splitting, as described in Section 11.1, we recover x, y, and the number, nj, of times coordinate j has been split in the history of B. Sub-box B could be split in one of two ways.
  1. (i)Splitting by rank
    If s > 2nr (min(nj+1)) , the box is always split. The splitting index is set to a coordinate i such that ni=min(nj).
  2. (ii)Splitting by expected gain
    If s 2nr (min(nj+1)) , the sub-box could be split along a coordinate where a maximal gain in function value is expected. This gain is estimated according to a local separable quadratic model obtained by fitting to 2nr+1 function values. If the expected gain is too small the sub-box is not split at all, and its level is increased by 1.
Eventually, a sub-box that is not eligible for splitting by expected gain will reach level 2nr (min(nj+1)) +1 and then be split by rank, as long as smax is large enough. As smax, the rule for splitting by rank ensures that each coordinate is split arbitrarily often.
Before describing the details of each splitting method, we introduce the procedure for correctly handling splitting at adaptive points and for dealing with unbounded intervals. Suppose we want to split the ith coordinate interval {xi,yi}, where we define {xi,yi}=[min(xi,yi),max(xi,yi)], for xiR and yiR¯, and where x is the basepoint of the sub-box being considered. The descendants of the sub-box should shrink sufficiently fast, so we should not split too close to xi. Moreover, if yi is large we want the new splitting value to not be too large, so we force it to belong to some smaller interval {ξ,ξ}, determined by
ξ = subint (xi,yi) ,  ξ = xi + (ξ-xi) / 10 ,  
where the function subint is defined by
subint (x,y) = { sign(y) if ​ 1000|x|<1 ​ and ​ |y|>1000 ; 10sign(y)|x| if ​ 1000|x|1 ​ and ​ |y|>1000|x| ; y otherwise.  

11.2.1 Splitting by rank

Consider a sub-box B with level s > 2nr (min(nj+1)) . Although the sub-box has reached a high level, there is at least one coordinate along which it has not been split very often. Among the i such that ni = min(nj) for B, select the splitting index to be the coordinate with the lowest πi (and hence highest variability rank). ‘Splitting by rank’ refers to the ranking of the coordinates by ni and πi.
If ni=0, so that B has never been split along coordinate i, the splitting is done according to the initialization list and the adaptively chosen golden-section split points, as described in Section 11.1. Also as covered there, new basepoints and opposite points are generated. The children having the smaller fraction of the golden-section split (that is, those with larger function values) are given level min{s+2,smax}. All other children are given level s+1.
Otherwise, B ranges between xi and yi in the ith coordinate direction. The splitting value is selected to be zi=xi+2(subint(xi,yi)-xi)/3; we are not attempting to split based on a large reduction in function value, merely in order to reduce the size of a large interval, so zi may not be optimal. Sub-box B is split at zi and the golden-section split point, producing three parts and requiring only one additional function evaluation, at the point x obtained from x by changing the ith coordinate to zi. The child with the smaller fraction of the golden-section split is given level min{s+2,smax}, while the other two parts are given level s+1. Basepoints are assigned as follows: the basepoint of the first child is taken to be x, and the basepoint of the second and third children is the point x. Opposite points are obtained by changing yi to the other end of the ith coordinate-interval of the corresponding child.

11.2.2 Splitting by expected gain

When a sub-box B has level s 2nr (min(nj+1)) , we compute the optimal splitting index and splitting value from a local separable quadratic used as a simple local approximation of the objective function. To fit this curve, for each coordinate we need two additional points and their function values. Such data may be recoverable from the history of B: whenever the ith coordinate was split in the history of B, we obtained values that can be used for the current quadratic interpolation in coordinate i.
We loop over i; for each coordinate we pursue the history of B back to the root box, and we take the first two points and function values we find, since these are expected to be closest to the current basepoint x. If the current coordinate has not yet been split we use the initialization list. Then we generate a local separable model e(ξ) for F(ξ) by interpolation at x and the 2nr additional points just collected:
e(ξ) = F(x) + i=1 n ei (ξi) .  
We define the expected gain e^i in function value when we evaluate at a new point obtained by changing coordinate i in the basepoint, for each i, based on two cases:
  1. (i)ni=0. We compute the expected gain as
    e^i = min 1j Li {fij} - f i pi .  
    Again, we split according to the initialization list, with the new basepoints and opposite points being as before.
  2. (ii)ni>0. Now, the ith component of our sub-box ranges from xi to yi. Using the quadratic partial correction function
    ei (ξi) = αi (ξi-xi) + βi (ξi-xi) 2  
    we can approximate the maximal gain expected when changing xi only. We will choose the splitting value from {ξ,ξ}. We compute
    e^i = min ξi {ξ,ξ} ei (ξi)  
    and call zi the minimizer in {ξ,ξ}.
    If the expected best function value fexp satisfies
    fexp = F(x) + min 1in e^i < fbest , (1)
    where fbest is the current best function value (including those function values obtained by local optimization), we expect the sub-box to contain a better point and so we split it, using as splitting index the component with minimal e^i. Equation (1) prevents wasting function calls by avoiding splitting sub-boxes whose basepoints have bad function values. These sub-boxes will eventually be split by rank anyway.
    We now have a splitting index and a splitting value zi. The sub-box is split at zi as long as ziyi, and at the golden-section split point; two or three children are produced. The larger fraction of the golden-section split receives level s+1, while the smaller fraction receives level min{s+2,smax}. If it is the case that ziyi and the third child is larger than the smaller of the two children from the golden-section split, the third child receives level s+1. Otherwise it is given the level min{s+2,smax}. The basepoint of the first child is set to x, and the basepoint of the second (and third if it exists) is obtained by changing the ith coordinate of x to zi. The opposite points are again derived by changing yi to the other end of the ith coordinate interval of B.
    If equation (1) does not hold, we expect no improvement. We do not split, and we increase the level of B by 1.

11.3 Local Search

The local optimization algorithm used by e05jbc uses linesearches along directions that are determined by minimizing quadratic models, all subject to bound constraints. Triples of vectors are computed using coordinate searches based on linesearches. These triples are used in triple search procedures to build local quadratic models for F. A trust region-type approach to minimize these models is then carried out, and more information about the coordinate search and the triple search can be found in Huyer and Neumaier (1999).
The local search starts by looking for better points without being too local, by making a triple search using points found by a coordinate search. This yields a new point and function value, an approximation of the gradient of the objective, and an approximation of the Hessian of the objective. Then the quadratic model for F is minimized over a small box, with the solution to that minimization problem then being used as a linesearch direction to minimize the objective. A measure r is computed to quantify the predictive quality of the quadratic model.
The third stage is the checking of termination criteria. The local search will stop if more than loclim visits to this part of the local search have occurred, where loclim is the value of the optional parameter Local Searches Limit. If that is not the case, it will stop if the limit on function calls has been exceeded (see the description of the optional parameter Function Evaluations Limit). The final criterion checks if no improvement can be made to the function value, or whether the approximated gradient g is small, in the sense that
|g|T max(|x|,| x old |) < loctol (f0-f) .  
The vector xold is the best point at the start of the current loop in this iterative local-search procedure, the constant loctol is the value of the optional parameter Local Searches Tolerance, f is the objective value at x, and f0 is the smallest function value found by the initialization procedure.
Next, e05jbc attempts to move away from the boundary, if any components of the current point lie there, using linesearches along the offending coordinates. Local searches are terminated if no improvement could be made.
The fifth stage carries out another triple search, but this time it does not use points from a coordinate search, rather points lying within the trust region box are taken.
The final stage modifies the trust region box to be bigger or smaller, depending on the quality of the quadratic model, minimizes the new quadratic model on that box, and does a linesearch in the direction of the minimizer. The value of r is updated using the new data, and then we go back to the third stage (checking of termination criteria).
The Hessians of the quadratic models generated by the local search may not be positive definite, so e05jbc uses the general nonlinear optimizer e04vhc to minimize the models.

12 Optional Parameters

Several optional parameters in e05jbc define choices in the problem specification or the algorithm logic. In order to reduce the number of formal arguments of e05jbc these optional parameters have associated default values that are appropriate for most problems. Therefore, you need only specify those optional parameters whose values are to be different from their default values.
The remainder of this section can be skipped if you wish to use the default values for all optional parameters.
The following is a list of the optional parameters available. A full description of each optional parameter is provided in Section 12.1.
Optional parameters may be specified by calling one, or more, of the functions e05jcc, e05jdc, e05jec, e05jfc and e05jgc before a call to e05jbc.
e05jcc reads options from an external options file, with Begin and End as the first and last lines respectively, and with each intermediate line defining a single optional parameter. For example,
 Begin
   Static Limit = 50
 End
The call
e05jcc (fileid, &state, &fail);
can then be used to read the file on the descriptor fileid as returned by a call of x04acc. The value fail.code= NE_NOERROR is returned on successful exit. e05jcc should be consulted for a full description of this method of supplying optional parameters.
e05jdc, e05jec, e05jfc or e05jgc can be called to supply options directly, one call being necessary for each optional parameter. e05jdc, e05jec, e05jfc or e05jgc should be consulted for a full description of this method of supplying optional parameters.
All optional parameters not specified by you are set to their default values. Valid values of optional parameters specified by you are unaltered by e05jbc and so remain in effect for subsequent calls to e05jbc, unless you explicitly change them.

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:
Option names are case-insensitive and must be provided in full; abbreviations are not recognized.
Defaults
This special keyword is used to reset all optional parameters to their default values, and any random state stored in state will be destroyed.
Any option value given with this keyword will be ignored. This optional parameter cannot be queried or got.
Function Evaluations LimitiDefault =100nr2
This puts an approximate limit on the number of function calls allowed. The total number of calls made is checked at the top of an internal iteration loop, so it is possible that a few calls more than nf may be made.
Constraint: nf>0.
Infinite Bound SizerDefault =rmax14
This defines the ‘infinite’ bound infbnd in the definition of the problem constraints. Any upper bound greater than or equal to infbnd will be regarded as (and similarly any lower bound less than or equal to -infbnd will be regarded as -).
Constraint: rmax14infbndrmax12.
Local SearchesaDefault =ON
If you want to try to accelerate convergence of e05jbc by starting local searches from candidate minima, you will require lcsrch to be ON.
Constraint: lcsrch=ON​ or ​OFF.
Local Searches LimitiDefault =50
This defines the maximal number of iterations to be used in the trust region loop of the local-search procedure.
Constraint: loclim>0.
Local Searches TolerancerDefault =2ε
The value of loctol is the multiplier used during local searches as a stopping criterion for when the approximated gradient is small, in the sense described in Section 11.3.
Constraint: loctol2ε.
Minimize Default
Maximize
These keywords specify the required direction of optimization. Any option value given with these keywords will be ignored.
Nolist Default
List
Optional parameter List enables printing of each optional parameter specification as it is supplied. Nolist suppresses this printing.
RepeatabilityaDefault =OFF
For use with random initialization lists (initmethod=Nag_Random). When set to ON, an internally-initialized random state is stored in state for use in subsequent calls to e05jbc.
Constraint: repeat=ON​ or ​OFF.
Splits LimitiDefault =d(nr+2)/3
Along with the initialization list list, this defines a limit on the number of times the root box will be split along any single coordinate direction. If Local Searches is OFF you may find the default value to be too small.
Constraint: smax>nr+2.
Static LimitiDefault =3nr
As the default termination criterion, computation stops when the best function value is static for stclim sweeps through levels. This parameter is ignored if you have specified a target value to reach in Target Objective Value.
Constraint: stclim>0.
Target Objective ErrorrDefault =ε14
If you have given a target objective value to reach in objval (the value of the optional parameter Target Objective Value), objerr sets your desired relative error (from above if Minimize is set, from below if Maximize is set) between obj and objval, as described in Section 7. See also the description of the optional parameter Target Objective Safeguard.
Constraint: objerr2ε.
Target Objective SafeguardrDefault =ε12
If you have given a target objective value to reach in objval (the value of the optional parameter Target Objective Value), objsfg sets your desired safeguarded termination tolerance, for when objval is close to zero.
Constraint: objsfg2ε.
Target Objective Valuer
This parameter may be set if you wish e05jbc to use a specific value as the target function value to reach during the optimization. Setting objval overrides the default termination criterion determined by the optional parameter Static Limit.