Kolmogorov complexity and its applications
Handbook of theoretical computer science (vol. A)
The evolution of size and shape
Advances in genetic programming
An analysis of genetic programming
An analysis of genetic programming
Code growth in genetic programming
GECCO '96 Proceedings of the 1st annual conference on Genetic and evolutionary computation
Using genetic programming to approximate maximum clique
GECCO '96 Proceedings of the 1st annual conference on Genetic and evolutionary computation
Implementing quantum genetic algorithms: a solution based on Grover's algorithm
Proceedings of the 3rd conference on Computing frontiers
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Recent theory work has shown that a Genetic Program (GP) used to produce programs may have output that is bounded above by the GP itself [1]. This paper presents proofs that show that 1) a program that is the output of a GP or any inductive process has complexity that can be bounded by the Kolmogorov complexity of the originating program; 2) this result does not hold if the random number generator used in the evolution is a true random source; and 3) an optimization problem being solved with a GP will have a complexity that can be bounded below by the growth rate of the minimum length problem representation used for the implementation. These results are then used to provide guidance for GP implementation.