Kolmogorov complexities Kmax, Kmin on computable partially ordered sets

Abstract

We introduce a machine free mathematical framework to get a natural formalization of some general notions of infinite computation in the context of Kolmogorov complexity. Namely, the classes MaxX DPR and MaxX DRec of functions X D which are pointwise maximum of partial or total computable sequences of functions where D = (D,<) is some computable partially ordered set. The enumeration theorem and the invariance theorem always hold for MaxX DPR, leading to a variant KD;max of Kolmogorov complexity. We characterize the orders D such that the enumeration theorem (resp. the invariance theorem) also holds for MaxX DRec . It turns out that MaxX DRec may satisfy the invariance theorem but not the enumeration theorem. Also, when MaxX DRec satisfies the invariance theorem then the Kolmogorov complexities associated to MaxX DRec and MaxX DPR are equal (up to a constant). Letting KDmin = KDrevmax, where Drev is the reverse order, we prove that either KDmin =ct KDmax =ct KD (=ct is equality up to a constant) or KDmin, KDmax are <=ct incomparable and <ct KD and >ct K0',D. We characterize the orders leading to each case. We also show that KDmin, KDmax cannot be both much smaller than KD at any point. These results are proved in a more general setting with two orders on D, one extending the other.