Some options are listed in italics. These options do not appear in the listing that optimoptions returns. To see why 'optimoptions hides these option values, see Options that optimoptions Hides.

Ensure that you pass options to the solver. Otherwise, patternsearch uses the default option values.

[x,fval] = ga(fun,x0,A,b,Aeq,beq,lb,ub,nonlcon,options)

'gaplotscorediversity' plots a histogram of the scores at each generation.

'gaplotstopping' plots stopping criteria levels.

'gaplotgenealogy' plots the genealogy of individuals. Lines from one generation to the next are color-coded to distinguish mutation children, crossover children, and elite individuals.

'gaplotscores' plots the scores of the individuals at each generation.

'gaplotdistance' plots the average distance between individuals at each generation.

'gaplotselection' plots a histogram of the parents.

'gaplotmaxconstr' plots the maximum nonlinear constraint violation at each generation. For ga, available only when the NonlinearConstraintAlgorithm option is 'auglag' (default for non-integer problems). Therefore, not available for integer-constrained problems, as they use the 'penalty' nonlinear constraint algorithm.

You can also create and use your own plot function. Structure of the Plot Functions describes the structure of a custom plot function. Pass any custom function as a function handle. For an example of a custom plot function, see Create Custom Plot Function.

'gaplotbestf' plots the best score value and mean score versus generation.

'gaplotbestindiv' plots the vector entries of the individual with the best fitness function value in each generation.

'gaplotexpectation' plots the expected number of children versus the raw scores at each generation.

'gaplotrange' plots the minimum, maximum, and mean score values in each generation.

'gaplotpareto' plots the Pareto front for the first two or three objective functions.

'gaplotparetodistance' plots a bar chart of the distance of each individual from its neighbors.

'gaplotrankhist' plots a histogram of the ranks of the individuals. Individuals of rank 1 are on the Pareto frontier. Individuals of rank 2 are lower than at least one rank 1 individual, but are not lower than any individuals from other ranks, etc.

'gaplotspread' plots the average spread as a function of iteration number.

'doubleVector' — Use this option if the individuals in the population have type double. Also, the recommended data type for mixed integer programming is 'doubleVector', using the technique in Mixed Integer ga Optimization. 'doubleVector' is the default data type.

'bitstring' — You can use this option if the individuals in the population have components that are 0 or 1.

For CreationFcn and MutationFcn, use 'gacreationuniform' and 'mutationuniform' or handles to custom functions. For CrossoverFcn, use 'crossoverscattered', 'crossoversinglepoint', 'crossovertwopoint', or a handle to a custom function.

The 'bitstring' data type can be awkward to use. ga ignores all constraints, including bounds, linear constraints, and nonlinear constraints. You cannot use a HybridFcn. To use binary variables most easily in ga, see Mixed Integer ga Optimization.

'custom' — Indicates a custom population type. In this case, you must also use a custom CrossoverFcn and MutationFcn. You must provide either a custom creation function or an InitialPopulationMatrix. You cannot use a HybridFcn, and ga ignores all constraints, including bounds, linear constraints, and nonlinear constraints.

[] uses the default creation function for your problem type.

'gacreationuniform' creates a random initial population with a uniform distribution. This is the default when there are no linear constraints, or when there are integer constraints. The uniform distribution is in the initial population range (InitialPopulationRange). The default values for InitialPopulationRange are [-10;10] for every component, or [-9999;10001] when there are integer constraints. These bounds are shifted and scaled to match any existing bounds lb and ub.

'gacreationlinearfeasible' is the default when there are linear constraints and no integer constraints. This choice creates a random initial population that satisfies all bounds and linear constraints. If there are linear constraints, 'gacreationlinearfeasible' creates many individuals on the boundaries of the constraint region, and creates a well-dispersed population. 'gacreationlinearfeasible' ignores InitialPopulationRange. 'gacreationlinearfeasible' calls linprog to create a feasible population with respect to bounds and linear constraints.

For an example showing its behavior, see Custom Plot Function and Linear Constraints in ga.

'gacreationnonlinearfeasible' is the default creation function for the 'penalty' nonlinear constraint algorithm. For details, see Constraint Parameters.

'gacreationuniformint' is the default creation function for ga when the problem has integer constraints. This function applies an artificial bound to unbounded components, generates individuals uniformly at random within the bounds, and then enforces integer constraints.

'gacreationsobol' is the default creation function for gamultiobj when the problem has integer constraints. The creation function uses a quasirandom Sobol sequence to generate a well-dispersed initial population. The population is feasible with respect to bounds, linear constraints, and integer constraints.

A function handle lets you write your own creation function, which must generate data of the type that you specify in PopulationType. For example,

options = optimoptions('ga','CreationFcn',@myfun);

Your creation function must have the following calling syntax.

function Population = myfun(GenomeLength, FitnessFcn, options)

The input arguments to the function are:

The function returns Population, the initial population for the genetic algorithm.

Passing Extra Parameters explains how to provide additional parameters to the function.

'fitscalingrank' — The default fitness scaling function, 'fitscalingrank', scales the raw scores based on the rank of each individual instead of its score. The rank of an individual is its position in the sorted scores. An individual with rank r has scaled score proportional to $$1/\sqrt{r}$$. So the scaled score of the most fit individual is proportional to 1, the scaled score of the next most fit is proportional to $$1/\sqrt{2}$$, and so on. Rank fitness scaling removes the effect of the spread of the raw scores. The square root makes poorly ranked individuals more nearly equal in score, compared to rank scoring. For more information, see Fitness Scaling.

'fitscalingprop' — Proportional scaling makes the scaled value of an individual proportional to its raw fitness score.

'fitscalingtop' — Top scaling scales the top individuals equally. You can modify the top scaling using an additional parameter:

options = optimoptions('ga',...
    'FitnessScalingFcn',{@fitscalingtop,quantity})

quantity specifies the number of individuals that are assigned positive scaled values. quantity can be an integer from 1 through the population size or a fraction from 0 through 1 specifying a fraction of the population size. The default value is 0.4. Each of the individuals that produce offspring is assigned an equal scaled value, while the rest are assigned the value 0. The scaled values have the form [01/n 1/n 0 0 1/n 0 0 1/n ...].

'fitscalingshiftlinear' — Shift linear scaling scales the raw scores so that the expectation of the fittest individual is equal to a constant called rate multiplied by the average score. You can modify the rate parameter:

options = optimoptions('ga','FitnessScalingFcn',...
    {@fitscalingshiftlinear, rate})

The default value of rate is 2.

A function handle lets you write your own scaling function.

options = optimoptions('ga','FitnessScalingFcn',@myfun);

Your scaling function must have the following calling syntax:

function expectation = myfun(scores, nParents)

The input arguments to the function are:

The function returns expectation, a column vector of scalars of the same length as scores, giving the scaled values of each member of the population. The sum of the entries of expectation must equal nParents.

Passing Extra Parameters explains how to provide additional parameters to the function.

'selectionstochunif' — The ga default selection function, 'selectionstochunif', lays out a line in which each parent corresponds to a section of the line of length proportional to its scaled value. The algorithm moves along the line in steps of equal size. At each step, the algorithm allocates a parent from the section it lands on. The first step is a uniform random number less than the step size.

'selectionremainder' — Remainder selection assigns parents deterministically from the integer part of each individual's scaled value and then uses roulette selection on the remaining fractional part. For example, if the scaled value of an individual is 2.3, that individual is listed twice as a parent because the integer part is 2. After parents have been assigned according to the integer parts of the scaled values, the rest of the parents are chosen stochastically. The probability that a parent is chosen in this step is proportional to the fractional part of its scaled value.

'selectionuniform' — Uniform selection chooses parents using the expectations and number of parents. Uniform selection is useful for debugging and testing, but is not a very effective search strategy.

'selectionroulette' — Roulette selection chooses parents by simulating a roulette wheel, in which the area of the section of the wheel corresponding to an individual is proportional to the individual's expectation. The algorithm uses a random number to select one of the sections with a probability equal to its area.

'selectiontournament' — Tournament selection chooses each parent by choosing size players at random and then choosing the best individual out of that set to be a parent. size must be at least 2. The default value of size is 4. Set size to a different value as follows:

options = optimoptions('ga','SelectionFcn',...
                     {@selectiontournament,size})

When NonlinearConstraintAlgorithm is Penalty, ga uses 'selectiontournament' with size 2.

A function handle enables you to write your own selection function.

options = optimoptions('ga','SelectionFcn',@myfun);

Your selection function must have the following calling syntax:

function parents = myfun(expectation, nParents, options)

ga provides the input arguments expectation, nParents, and options. Your function returns the indices of the parents.

The input arguments to the function are:

The function returns parents, a row vector of length nParents containing the indices of the parents that you select.

Passing Extra Parameters explains how to provide additional parameters to the function.

'mutationgaussian' — The default mutation function for ga for unconstrained problems, 'mutationgaussian', adds a random number taken from a Gaussian distribution with mean 0 to each entry of the parent vector. The standard deviation of this distribution is determined by the parameters scale and shrink, and by the InitialPopulationRange option. Set scale and shrink as follows:

options = optimoptions('ga','MutationFcn', ... 
{@mutationgaussian, scale, shrink})

The default value of both scale and shrink is 1.

'mutationuniform' — Uniform mutation is a two-step process. First, the algorithm selects a fraction of the vector entries of an individual for mutation, where each entry has a probability rate of being mutated. The default value of rate is 0.01. In the second step, the algorithm replaces each selected entry by a random number selected uniformly from the range for that entry.

To change the default value of rate,

options = optimoptions('ga','MutationFcn', {@mutationuniform, rate})

'mutationadaptfeasible', the default mutation function for gamultiobj and for ga when there are noninteger constraints, randomly generates directions that are adaptive with respect to the last successful or unsuccessful generation. The mutation chooses a direction and step length that satisfies bounds and linear constraints.

'mutationpower' is the default mutation function for ga and gamultiobj when the problem has integer constraints. Power mutation mutates a parent, x, via the following. For each component of the parent, the ith component of the child is given by:

mutationChild(i) = x(i) - s(x(i) - lb(i)) if t < r

= x(i) + s(ub(i) - x(i)) if t >= r.

Here, t is the scaled distance of x(i) from the ith component of the lower bound, lb(i). s is a random variable drawn from a power distribution and r is a random number drawn from a uniform distribution.

This function can handle lb(i) = ub(i). New children are generated with the ith component set to lb(i), which equals ub(i). For more information on this crossover function see section 2.1 of the following reference:

Kusum Deep, Krishna Pratap Singsh, M. L. Kansal, C. Mohan. A real coded genetic algorithm for solving integer and mixed integer optimization problems. Applied Mathematics and Computation, 212 (2009), 505–518.

'mutationpositivebasis' — This mutation function is similar to orthogonal MADS steps, modified for linear constraints and bounds.

A function handle enables you to write your own mutation function.

options = optimoptions('ga','MutationFcn',@myfun);

Your mutation function must have this calling syntax:

function mutationChildren = myfun(parents, options, nvars, 
FitnessFcn, state, thisScore, thisPopulation)

The arguments to the function are

The function returns mutationChildren—the mutated offspring—as a matrix where rows correspond to the children. The number of columns of the matrix is nvars.

Passing Extra Parameters explains how to provide additional parameters to the function.

'crossoverscattered', the default crossover function for problems without linear constraints, creates a random binary vector and selects the genes where the vector is a 1 from the first parent, and the genes where the vector is a 0 from the second parent, and combines the genes to form the child. For example, if p1 and p2 are the parents

p1 = [a b c d e f g h]
p2 = [1 2 3 4 5 6 7 8]

and the binary vector is [1 1 0 0 1 0 0 0], the function returns the following child:

child1 = [a b 3 4 e 6 7 8]

'crossoversinglepoint' chooses a random integer n between 1 and nvars and then

and the crossover point is 3, the function returns the following child.

child = [a b c 4 5 6 7 8]

'crossovertwopoint' selects two random integers m and n between 1 and nvars. The function selects

The algorithm then concatenates these genes to form a single gene. For example, if p1 and p2 are the parents

p1 = [a b c d e f g h]
p2 = [1 2 3 4 5 6 7 8]

and the crossover points are 3 and 6, the function returns the following child.

child = [a b c 4 5 6 g h]

'crossoverintermediate', the default crossover function when there are linear constraints, creates children by taking a weighted average of the parents. You can specify the weights by a single parameter, ratio, which can be a scalar or a row vector of length nvars. The default value of ratio is a vector of all 1's. Set the ratio parameter as follows.

options = optimoptions('ga','CrossoverFcn', ...  
{@crossoverintermediate, ratio});

'crossoverintermediate' creates the child from parent1 and parent2 using the following formula.

child = parent1 + rand * Ratio * ( parent2 - parent1)

If all the entries of ratio lie in the range [0, 1], the children produced are within the hypercube defined by placing the parents at opposite vertices. If ratio is not in that range, the children might lie outside the hypercube. If ratio is a scalar, then all the children lie on the line between the parents.

'crossoverlaplace' is the default crossover function when the problem has integer constraints. The Laplace crossover generates children using either of the following formulae (chosen at random):

xOverKid = p1 + bl*abs(p1 – p2)

xOverKid = p2 + bl*abs(p1 – p2)

Here, p1, p2 are the parents of xOverKid and bl is a random number generated from a Laplace distribution. For more information on this crossover function see section 2.1 of the following reference:

Kusum Deep, Krishna Pratap Singsh, M. L. Kansal, C. Mohan. A real coded genetic algorithm for solving integer and mixed integer optimization problems. Applied Mathematics and Computation, 212 (2009), 505–518.

'crossoverheuristic' returns a child that lies on the line containing the two parents, a small distance away from the parent with the better fitness value in the direction away from the parent with the worse fitness value. You can specify how far the child is from the better parent by the parameter ratio. The default value of ratiois 1.2. Set the ratio parameter as follows.

options = optimoptions('ga','CrossoverFcn',...
                   {@crossoverheuristic,ratio});

If parent1 and parent2 are the parents, and parent1 has the better fitness value, the function returns the child

child = parent2 + ratio * (parent1 - parent2);

'crossoverarithmetic' creates children that are the weighted arithmetic mean of two parents. Children are always feasible with respect to linear constraints and bounds.

A function handle enables you to write your own crossover function.

options = optimoptions('ga','CrossoverFcn',@myfun);

Your crossover function must have the following calling syntax.

xoverKids = myfun(parents, options, nvars, FitnessFcn, ...
    unused,thisPopulation)

The arguments to the function are

The function returns xoverKids—the crossover offspring—as a matrix where rows correspond to the children. The number of columns of the matrix is nvars.

Passing Extra Parameters explains how to provide additional parameters to the function.

MigrationDirection — Migration can take place in one or both directions.

Migration wraps at the ends of the subpopulations. That is, the last subpopulation migrates into the first, and the first may migrate into the last.

MigrationInterval — Specifies how many generation pass between migrations. For example, if you set MigrationInterval to 20, migration takes place every 20 generations.

MigrationFraction — Specifies how many individuals move between subpopulations. MigrationFraction specifies the fraction of the smaller of the two subpopulations that moves. For example, if individuals migrate from a subpopulation of 50 individuals into a subpopulation of 100 individuals and you set MigrationFraction to 0.1, the number of individuals that migrate is 0.1*50=5.

ParetoFraction — Sets the fraction of individuals to keep on the first Pareto front while the solver selects individuals from higher fronts. This option is a scalar between 0 and 1.

DistanceMeasureFcn — Defines a handle to the function that computes distance measure of individuals, computed in decision variable space (genotype, also termed design variable space) or in function space (phenotype). For example, the default distance measure function is 'distancecrowding' in function space, which is the same as {@distancecrowding,'phenotype'}.

“Distance” measures a crowding of each individual in a population. Choose between the following:

MaxGenerations — Specifies the maximum number of iterations for the genetic algorithm to perform. The default is 100*numberOfVariables.

MaxTime — Specifies the maximum time in seconds the genetic algorithm runs before stopping, as measured by tic and toc. This limit is enforced after each iteration, so ga can exceed the limit when an iteration takes substantial time.

FitnessLimit — The algorithm stops if the best fitness value is less than or equal to the value of FitnessLimit. Does not apply to gamultiobj.

MaxStallGenerations — The algorithm stops if the average relative change in the best fitness function value over MaxStallGenerations is less than or equal to FunctionTolerance. (If the StallTest option is 'geometricWeighted', then the test is for a geometric weighted average relative change.) For a problem with nonlinear constraints, MaxStallGenerations applies to the subproblem (see Nonlinear Constraint Solver Algorithms for Genetic Algorithm).

For gamultiobj, if the geometric average of the relative change in the spread of the Pareto solutions over MaxStallGenerations is less than FunctionTolerance, and the final spread is smaller than the average spread over the last MaxStallGenerations, then the algorithm stops. The geometric average coefficient is ½. The spread is a measure of the movement of the Pareto front. See gamultiobj Algorithm.

MaxStallTime — The algorithm stops if there is no improvement in the best fitness value for an interval of time in seconds specified by MaxStallTime, as measured by tic and toc.

FunctionTolerance — The algorithm stops if the average relative change in the best fitness function value over MaxStallGenerations is less than or equal to FunctionTolerance. (If the StallTest option is 'geometricWeighted', then the test is for a geometric weighted average relative change.)

For gamultiobj, if the geometric average of the relative change in the spread of the Pareto solutions over MaxStallGenerations is less than FunctionTolerance, and the final spread is smaller than the average spread over the last MaxStallGenerations, then the algorithm stops. The geometric average coefficient is ½. The spread is a measure of the movement of the Pareto front. See gamultiobj Algorithm.

ConstraintTolerance — The ConstraintTolerance is not used as stopping criterion. It is used to determine the feasibility with respect to nonlinear constraints. Also, max(sqrt(eps),ConstraintTolerance) determines feasibility with respect to linear constraints.

'final' (default) — The reason for stopping is displayed.

'off' or the equivalent 'none' — No output is displayed.

'iter' — Information is displayed at each iteration.

'diagnose' — Information is displayed at each iteration. In addition, the diagnostic lists some problem information and the options that have been changed from the defaults.

Generation — Generation number

f-count — Cumulative number of fitness function evaluations

Best f(x) — Best fitness function value

Mean f(x) — Mean fitness function value

Stall generations — Number of generations since the last improvement of the fitness function

Max Constraint — Maximum nonlinear constraint violation

When 'UseVectorized' is false (default), ga calls the fitness function on one individual at a time as it loops through the population. (This assumes 'UseParallel' is at its default value of false.)

When 'UseVectorized' is true, ga calls the fitness function on the entire population at once, in a single call to the fitness function.

If there are nonlinear constraints, the fitness function and the nonlinear constraints all need to be vectorized in order for the algorithm to compute in a vectorized manner.

See Vectorize the Fitness Function for an example.

When UseParallel is true, ga calls the fitness function in parallel, using the parallel environment you established (see How to Use Parallel Processing in Global Optimization Toolbox). Set UseParallel to false (default) to compute serially.