Maxwell's demon and the entropy cost of information

We present an analysis of Szilard's one-molecule Maxwells demon, including a detailed entropy accounting, that suggests a general theory of the entropy cost of information. It is shown that the entropy of the demon increases during the expansion step, due to the decoupling of the molecule from rile measurement information. It is also shown that there is an entropy symmetry between the measurement and erasure steps, whereby the two steps additively share a constant entropy change, but tire proportion that occurs during each of the two steps is arbitrary. Therefore the measurement step may be accompanied by art entropy increase, a decrease, or no change at all, and likewise for the erasure step. Generalizing beyond the demon, decorrelation between a physical system and information about that system always causes an entropy increase in the joint system comprised of both the original system and the information. Decorrelation causes a net entropy increase in the universe unless, as in the Szilard demon, the information is used to decrease entropy elsewhere before the correlation is lost. Thus, information is thermodynamically costly precisely to the extent that it is not used to obtain work from the measured system.