When I've implemented genetic algorithms in the past, what I've done is to pick the parents always probabilistically - that is, you don't necessarily pick the winners, but you will pick the winners with a probability depending on how much better they are than everyone else (based on the fitness function).
I cannot remember the name of the paper to back it up, but there is a mathematical proof that "ranking" selection converges faster than "proportional" selection. If you try looking around for "genetic algorithm selection strategy" you may find something about this.
Just to be more specific, since pedalpete asked, there are two kinds of selection algorithms: one based on rank, one based on fitness proportion. Consider a population with 6 solutions and the following fitness values:
Solution Fitness Value
In ranking selection, you would take the top k (say, 2 or 4) and use those as the parents for your next generation. In proportional ranking, to form each "child", you randomly pick the parent with a probability based on fitness value:
In this scheme, F may end up being a parent in the next generation. With a larger population size (100 for example - may be larger or smaller depending on the search space), this will mean that the bottom solutions will end up being a parent some of the time. This is OK, because even "bad" solutions have some "good" aspects.