A resource theory of Maxwell's demons

Motivated by recent progress on the motive power of information in quantum thermodynamics, we put forth an operational resource theory of Maxwell's demons. We show that the resourceful ({\em daemonic}) states can be partitioned into at most nine irreducible subsets. The sets can be classified by a rank akin to the Schmidt rank for entanglement theory. Moreover, we show that there exists a natural monotone, called the wickedness, which quantifies the multilevel resource content of the states. The present resource theory is shown to share deep connections with the resource theory of thermodynamics. In particular, the nine irreducible sets are found to be characterized by well defined temperatures which, however, are not monotonic in the wickedness. This result, as we demonstrate, is found to have dramatic consequences for Landauer's erasure principle. Our analysis therefore settles a longstanding debate surrounding the identity of Maxwell's demons and the operational significance of other related fundamental thermodynamic entities.