Title :
Convergence analysis of canonical genetic algorithms
Author_Institution :
Dept. of Comput. Sci., Dortmund Univ., Germany
fDate :
1/1/1994 12:00:00 AM
Abstract :
This paper analyzes the convergence properties of the canonical genetic algorithm (CGA) with mutation, crossover and proportional reproduction applied to static optimization problems. It is proved by means of homogeneous finite Markov chain analysis that a CGA will never converge to the global optimum regardless of the initialization, crossover, operator and objective function. But variants of CGA´s that always maintain the best solution in the population, either before or after selection, are shown to converge to the global optimum due to the irreducibility property of the underlying original nonconvergent CGA. These results are discussed with respect to the schema theorem
Keywords :
Markov processes; convergence; genetic algorithms; best solution; canonical genetic algorithms; convergence analysis; convergence properties; crossover; homogeneous finite Markov chain analysis; irreducibility property; mutation; proportional reproduction; schema theorem; static optimization problems; Algorithm design and analysis; Biological cells; Computer science; Convergence; Genetic algorithms; Genetic mutations; Hamming distance; Terminology;
Journal_Title :
Neural Networks, IEEE Transactions on
