Hyperschema theory for GP with one-point crossover, building blocks, and some new results in GA theory

Abstract

Two main weaknesses of GA and GP schema theorems are that they provide only information 011 the expected value of the number of instances of a given schema at the next generation E[m(H, t + 1)], and they can only give a lower bound for such a quantity. This paper presents new theoretical results 011 GP and GA schemata which largely overcome these weaknesses. Firstly, unlike previous results which concentrated 011 schema survival and disruption, our results extend to GP recent work 011 GA theory by Stephens and Waelbroeck. and make the effects and the mechanisms of schema creation explicit. This allows us to give an exact formulation (rather than a lower bound) for the expected number of instances of a schema at the next generation. Thanks to this formulation we are then able to provide in improved version for an earlier GP schema theorem in which some schema creation events are accounted for. thus obtaining a tighter bound for E[m(H, t + 1)]. This bound is a function of the selection probabilities of the schema itself and of a set of lower-order schemata which one-point, crossover uses to build instances of the schema. This result supports the existence of building blocks in GP which, however, are not necessarily all short., low-order or highly fit.. Building 011 earlier work, we show how Stephens and Waelbroeck’s GA results and the new GP results described in the paper can be used to evaluate schema variance, signal-t.o-noise ratio and, in general, the probability distribution of m(H, t + 1). In addition, we show how the expectation operator can be removed from the schema theorem so as to predict, with a known probability whether m(H,t + 1) (rather than E[m(H,t + 1)]) is going to be above a given threshold.