E05 (Glopt)

Global Optimization of a Function

Global optimization involves finding the absolute maximum or minimum value of a function (the objective function) of several variables, possibly subject to restrictions (defined by a set of bounds or constraint functions) on the values of the variables. Where Chapter E04 treats local nonlinear optimization problems as well as convex optimization problems (for which local optima are by definition also global), this chapter tries to handle finding global optima of non-convex nonlinear optimization problems. Such problems can be much harder to solve than local optimization problems because it is difficult to determine whether a potential optimum found is global, and because of the nonlocal methods required to avoid becoming trapped near local optima.

This introduction is a brief guide to the subject of global optimization, designed for the casual user. For further details you may find it beneficial to consult a more detailed text, see Neumaier (2004). Furthermore, much of the material in the E04 Chapter Introduction is also relevant in this context and it is strongly recommended that you read Section 2.6 in the E04 Chapter Introduction.

Some solvers in this chapter have been integrated in to the NAG optimization modelling suite, which provides an easy-to-use and flexible way of defining optimization problems among numerous solvers of the NAG library. All utility routines from the suite can be used to define a compatible problem to be solved by the integrated solvers; see Section 4.1 in the E04 Chapter Introduction for more details.

For the purposes of this Library, the global optimization problem is

where $F\left(\mathbf{x}\right)$ (the objective function) is a real function; the vectors ${\mathbf{l}}_{x}$ and ${\mathbf{u}}_{x}$ are elements of ${\overline{R}}^{n}$, where $\overline{R}$ denotes the extended reals $R\cup \{-\infty ,\infty \}$; and where $\mathbf{c}$ is a vector of $m$ constraint functions ${c}_{1},\dots ,{c}_{m}$, with ${\mathbf{l}}_{c}$ and ${\mathbf{u}}_{c}$ defining the constraints on $\mathbf{c}\left(\mathbf{x}\right)$. If $m=0$ the problem is said to be bound constrained. Relational operators between vectors are interpreted elementwise. The feasible region $\mathrm{\Phi}$ is the set of all points (feasible points) that satisfy all of the constraints. A solution of (1) is a feasible point $\hat{\mathbf{x}}\in \mathrm{\Phi}$ satisfying

$$\underset{\mathbf{x}\in {R}^{n}}{\mathrm{minimize}}\phantom{\rule{0.25em}{0ex}}F\left(\mathbf{x}\right)\text{\hspace{1em} subject to \hspace{1em}}{\mathbf{l}}_{x}\le \mathbf{x}\le {\mathbf{u}}_{x}\text{\hspace{1em} and \hspace{1em}}{\mathbf{l}}_{c}\le \mathbf{c}\left(\mathbf{x}\right)\le {\mathbf{u}}_{c}\text{,}$$ | (1) |

$$F\left(\hat{\mathbf{x}}\right)=\underset{\mathbf{x}\in \mathrm{\Phi}}{\mathrm{min}}\phantom{\rule{0.25em}{0ex}}F\left(\mathbf{x}\right)\text{.}$$ |

A local minimum minimizes $F$ only on some neighbourhood of $\hat{\mathbf{x}}$. If a local minimum has the smallest objective value over all the local minima, then it is a global minimum.

A global optimization algorithm is called asymptotically complete if

- (i)assuming indefinitely long run-time and exact computations, a global minimum will be found with certainty (probability one), but
- (ii)the algorithm has no way of knowing when a global minimum has been found.

In comparison, a complete method satisfies (i) as well as the algorithm being able to recognize a global minimum (to prescribed tolerances) within a finite amount of time.

It is important to appreciate that, for finding a solution exactly, bounds on the amount of work may be very pessimistic. What complete methods guarantee is the absence of any deficiency that would prevent a global minimum from **eventually** being found. To achieve termination with certainty in a finite amount of time, the algorithm requires access to global information about the problem. In the case where only function values are available, as in e05kbc, stopping criteria based on heuristics are present. This is because such a class of method can only terminate with certainty by performing an expensive dense search.

In contrast, incomplete methods have intuitive heuristics for searching but no guarantee of not getting stuck near nonglobal, local, minima. Often, to make incomplete methods efficient, expert knowledge on the particular problem class to be solved is required. Examples of incomplete methods include Particle Swarm Optimization (PSO), Genetic Algorithms (GA), Simulated Annealing (SA), Ant Colony Optimization (ACO) and Covariance Matrix Adaptation Evolutionary Strategies (CMA-ES). PSO has been implemented in the functions e05sac and e05sbc. Such functions must also use heuristics to stop the algorithm as again an expensive, dense search would be required to guarantee that no superior optima are present.

Most complete methods recursively split the original problem into smaller, more manageable subproblems. This technique is called branching. Branching is usually accompanied by a selection process that splits favourable branches more frequently than others. For example, with branch and bound methods, bounds on the objective function for each subproblem are computed in an attempt to eliminate those subregions where no improvement will occur.

Branching methods use a branching scheme to generate sequences of sub-boxes that eventually cover the feasible region. At least one function evaluation is made for every sub-box, and new sub-boxes are generated by splitting existing ones. Using appropriate splitting rules, convergence to zero of the diameters of sub-boxes is assured. For example, always splitting the oldest box along the oldest side, provided the children do not have too small a volume compared with the parent, guarantees convergence of the method, in the sense described in Neumaier (2004).

Efficiency can be enhanced by carefully balancing global and local searches. While the global part of the search splits sub-boxes with large unexplored territory, the local part usually entails splitting boxes with good function values. For example, the sub-box with the best function value should always be split. A method may also be improved by launching local searches from appropriate candidate local minima.

The function e05kbc searches for a global minimizer using branching to recursively split the search space in a nonuniform manner. It divides, or splits, the root box of the search into smaller sub-boxes. Each sub-box contains a distinguished basepoint at which the objective function is sampled. We shall sometimes say ‘the function value of the (sub)box’ as shorthand for ‘the function value of the basepoint of the (sub)box’. The splitting procedure biases the search in favour of those sub-boxes where low function values are expected.

The global part of the algorithm entails splitting sub-boxes that enclose large unexplored territory, while the local part of the algorithm entails splitting sub-boxes that have good function values. A balance between the global and local part is achieved using a multi-level approach, where every sub-box is assigned a level $s\in \{0,1,\dots ,{s}_{\mathrm{max}}\}$. You can control the value of ${s}_{\mathrm{max}}$ using the optional parameter ${\mathbf{MCS\; Splits\; Limit}}$. Whenever a sub-box of intermediate level $0<s<{s}_{\mathrm{max}}$ is split each descendant will be given a new level, and the original sub-box's level is set to $0$: a sub-box with level $0$ has already been split; a sub-box with level ${s}_{\mathrm{max}}$ will be split no further. This entire process is described in more detail in Section 11.1 in **e05kbc**, where the initialization procedure used to produce an initial set of sub-boxes is outlined, and the method by which the algorithm sweeps through levels is discussed. Each sweep starts with the sub-boxes at the lowest level, a process thus forming the global part of the algorithm. At each level the sub-box with the best function value is selected for splitting; this forms the local part of the algorithm.

The process by which sub-boxes are split is explained in Section 11.2 in **e05kbc**. It is a variant of the standard coordinate search method: the solver splits along a single coordinate at a time, at adaptively chosen points. In most cases one new function evaluation is needed to split a sub-box into two or three children. Each child is given a basepoint chosen to differ from the basepoint of the parent in at most one coordinate, and safeguards are present to ensure a degree of symmetry in the splits.

If you set the optional parameter ${\mathbf{MCS\; Local\; Searches}}$ to be $\mathrm{OFF}$, then the basepoints and function values of sub-boxes of maximum level ${s}_{\mathrm{max}}$ are put into a ‘shopping basket’ of candidate minima. Turning ${\mathbf{MCS\; Local\; Searches}}$ $\mathrm{ON}$ (the default setting) will enable local searches to be started from these basepoints before they go into the shopping basket. The local search will go ahead providing the basepoint is not likely to be in the basin of attraction of a previously-found local minimum. The search itself uses a trust region approach, and is explained in Section 11.3 in **e05kbc**: local quadratic models are built by a triple search, then a linesearch is made along the direction obtained by minimizing the quadratic on a region where it is a good approximation to the objective function. The quadratic need not be positive definite, so a general nonlinear optimizer is used to minimize the model.

The functions e05sac and e05sbc search for a global optimum using a variant of the Particle Swarm Optimization (PSO) algorithm. PSO is an heuristic algorithm similar in its behaviour to GA, ACO, SA and others. A set of particles (the swarm) is generated in the search space, and advances at each iteration following an heuristic velocity based upon the best candidate found by an individual particle (cognitive memory), the best candidate found by all the particles (global memory) and inertia. The inertia is provided by a decreasingly weighted contribution from a particle's current velocity. This mix allows for a global search of the domain in question.

The rate at which the swarm contracts and expands about potential optima is user controllable, allowing expert knowledge to be used when available. Furthermore, the algorithm may be coupled with a selection of local optimizers. These may be called during the iterations of the heuristic algorithm (the interior phase) to hasten the discovery of locally optimal points. They may also be called following the heuristic iterations (the exterior phase) to attempt to refine the final solution. Different options may be set for the local optimizer in each phase. For further details see Section 11 in e05sac and e05sbc.

Function e05ucc attempts to find the global minimum of an arbitrary smooth function subject to constraints (which may include simple bounds on the variables, linear constraints and smooth nonlinear constraints) by generating a number of different starting points and using
a sequential quadratic programming local minimizer.
Function e05usc takes the same approach in attempting to find the global minimum of an arbitrary smooth sum of squares function using
a sequential quadratic programming local minimizer.

The more starting points chosen, the greater the degree of confidence that you might have in the returned results. Facilities are provided to allow you to specify the starting points and to provide for subsequent runs with different starting points as an additional means of gaining confidence in the results.

You may also request that a number of solutions be provided, ordered in increasing value of the local optima. This may be useful if a local solution has a desirable property not exhibited by the best local optimum computed, the putative global optimum.

e05kbc is based on the multi-level coordinate search method of Huyer and Neumaier (1999). It is an asymptotically complete method for bound constrained problems based on local information (function values) only, employing branching and local searches to accelerate convergence. This algorithm has been integrated to the NAG optimization modelling suite, see Section 4.1 in the E04 Chapter Introduction for more details.

If the problem has nonlinear constraints and is sufficiently smooth then you are advised to consider a multiple start technique. e05ucc and e05usc are provided for this purpose. Both e05ucc and e05usc use the functions e05zkc and e05zlc for initialization and option setting.

The suite of particle swarm optimization (PSO) functions are to be considered as experimental and are not recommended for production or mission-critical applications. They are only recommended as a last resort (should other methods fail) or for comparitive purposes.

Both e05sac and e05sbc use the functions e05zkc and e05zlc for initialization and option setting. These functions predominantly use function values only, although derivatives can be provided for coupled local minimization functions.

e05sac is a simplified version of e05sbc with less functionality. In particular, e05sac does not support general constraint handling whereas e05sbc does support general nonlinear, non-equality constraints.

If the objective function is smooth and the problem has only simple bound constraints then
all
algorithms are applicable. For low dimensional problems (up to $20$) e05kbc is preferred. With increasing dimension the multi-start methods may be
better.

The particle swarm methods are potentially useful when there is no smoothness in the objective function (e.g., due to noise) and, for the simple-bound constrained problem, e05sac may be appropriate.

Currently there is no routine in this chapter using a complete method that can handle constraints that are not bound constraints.

Nonlinear programming (NLP) – global optimization, |

bound constrained, |

branching algorithm, multi-level coordinate search | e05kbc |

heuristic algorithm, particle swarm optimization (PSO) | e05sac |

generic, including nonlinearly constrained, |

heuristic algorithm, particle swarm optimization (PSO) | e05sbc |

multi-start | e05ucc |

Nonlinear least squares, data fitting – global optimization, |

generic, including nonlinearly constrained, |

multi-start | e05usc |

Service functions, |

option setting functions, |

e05sac, e05sbc, e05ucc and e05usc, |

supply optional parameter values from a character string | e05zkc |

retrieve optional parameter values | e05zlc |

None.

None.

Gill P E, Murray W and Wright M H (1981) *Practical Optimization* Academic Press

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

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

Neumaier A (2004) Complete search in constrained global optimization *Acta Numerica* **13** 271–369

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