Domains, Information Frames, and Their Logic
Abstract
In sp25, continuous information frames were introduced that capture exactly all continuous domains. They are obtained from the information frames considered in sp21 by omitting the conservativity requirement. Information frames generalise Scott's information systems~sc82: Instead of the global consistency predicate, there is now a local consistency predicate for each token. Strong information frames are obtained by strengthening the conditions for these predicates. Let and be the corresponding categories. In sxx08 another generalisation of Scott's information systems was introduced which also exactly captures all continuous domains. As shown in hzl15, the definition can be simplified while maintaining the representation result. Let and be the corresponding categories. It is shown that all these categories are equivalent. Moreover, the equivalence extends to the subcategories of (strong) continuous information frames with truth elements. Such information frames capture exactly all pointed continuous domains. Continuous information frames are families of rudimentary logics, associated with each token is a local consistency predicate and an entailment relation. However, they lack the expressive power of propositional logic. In an attempt to make each of this logics more expressible, continuous stratified conjunctive logics are introduced. These are families of conjunctive logics. The category of such logics is shown to be isomorphic to , the category of strong continuous information frames with a truth element.
Turn this paper into a full lesson
ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.