Department of Mathematics

We consider a random fitness landscape on the space of haploid diallelic genotypes with n genetic loci, where each genotype is considered either inviable or viable depending on whether or not there are any incompatibilities among its allele pairs. We suppose that each allele pair in the set of all possible allele pairs on the n loci is independently incompatible with probability p=c/(2n). We examine the connectivity of the viable genotypes under single locus mutations and show that, for 01, there are no viable genotypes with probability converging to one. The genotype space is equivalent to the n-dimensional hypercube and the viable genotypes are solutions to a random 2-SAT problem, so the same result holds for the connectivity of solutions in the hypercube to a random 2-SAT problem.