The hyperclimbing hypothesis is a hypothetical explanation for adaptation in
genetic algorithms with uniform crossover (UGAs). Hyperclimbing is an
intuitive, general-purpose, non-local search heuristic applicable to discrete
product spaces with rugged or stochastic cost functions. The strength of this
heuristic lie in its insusceptibility to local optima when the cost function is
deterministic, and its tolerance for noise when the cost function is
stochastic. Hyperclimbing works by decimating a search space, i.e. by
iteratively fixing the values of small numbers of variables. The hyperclimbing
hypothesis holds that UGAs work by implementing efficient hyperclimbing. Proof
of concept for this hypothesis comes from the use of a novel analytic technique
involving the exploitation of algorithmic symmetry. We have also obtained
experimental results that show that a simple tweak inspired by the
hyperclimbing hypothesis dramatically improves the performance of a UGA on
large, random instances of MAX-3SAT and the Sherrington Kirkpatrick Spin
Glasses problem.Comment: 22 pages, 5 figure