Documentation

Dominance — A point x dominates a point y for a vector-valued objective function f when:

The term "dominate" is equivalent to the term "inferior:" x dominates y exactly when y is inferior to x.

A nondominated set among a set of points P is the set of points Q in P that are not dominated by any point in P.

Rank — For feasible individuals, there is an iterative definition of the rank of an individual. Rank 1 individuals are not dominated by any other individuals. Rank 2 individuals are dominated only by rank 1 individuals. In general, rank k individuals are dominated only by individuals in rank k - 1 or lower.

Individuals with a lower rank have a higher chance of selection (lower rank is better).

All infeasible individuals have a worse rank than any feasible individual. Within the infeasible population, the rank is the order by sorted infeasibility measure, plus the highest rank for feasible members.

gamultiobj uses rank to select parents.

Crowding Distance — The crowding distance is a measure of the closeness of an individual to its nearest neighbors. The gamultiobj algorithm measures distance among individuals of the same rank. By default, the algorithm measures distance in objective function space. However, you can measure the distance in decision variable space (also termed design variable space) by setting the DistanceMeasureFcn option to {@distancecrowding,'genotype'}.

The algorithm sets the distance of individuals at the extreme positions to Inf. For the remaining individuals, the algorithm calculates distance as a sum over the dimensions of the normalized absolute distances between the individual's sorted neighbors. In other words, for dimension m and sorted, scaled individual i:

The algorithm sorts each dimension separately, so the term neighbors means neighbors in each dimension.

Individuals of the same rank with a higher distance have a higher chance of selection (higher distance is better).

You can choose a different crowding distance measure than the default @distancecrowding function. See Multiobjective Options.

Crowding distance is one factor in the calculation of the spread, which is part of a stopping criterion. Crowding distance is also used as a tie-breaker in tournament selection, when two selected individuals have the same rank.

Spread — The spread is a measure of the movement of the Pareto set. To calculate the spread, the gamultiobj algorithm first evaluates σ, the standard deviation of the crowding distance measure of points that are on the Pareto front with finite distance. Q is the number of these points, and d is the average distance measure among these points. The algorithm then evaluates μ, the sum over the k objective function indices of the norm of the difference between the current minimum-value Pareto point for that index and the minimum point for that index in the previous iteration. The spread is then

The spread is small when the extreme objective function values do not change much between iterations (that is, μ is small) and when the points on the Pareto front are spread evenly (that is, σ is small).

gamultiobj uses the spread in a stopping condition. Iterations halt when the spread does not change much, and the final spread is less than an average of recent spreads. See Stopping Conditions.