• DocumentCode
    2544937
  • Title

    CoQMTU: A Higher-Order Type Theory with a Predicative Hierarchy of Universes Parametrized by a Decidable First-Order Theory

  • Author

    Barras, Bruno ; Jouannaud, Jean-Pierre ; Strub, Pierre-Yves ; Wang, Qian

  • Author_Institution
    INRIA Saclay, Ile de France, Orsay, France
  • fYear
    2011
  • fDate
    21-24 June 2011
  • Firstpage
    143
  • Lastpage
    151
  • Abstract
    We study a complex type theory, a Calculus of Inductive Constructions with a predicative hierarchy of universes and a first-order theory T built in its conversion relation. The theory T is specified abstractly, by a set of constructors, a set of defined symbols, axioms expressing that constructors are free and defined symbols completely defined, and a generic elimination principle relying on crucial properties of first-order structures satisfying the axioms. We first show that CoqMTU enjoys all basic meta-theoretical properties of such calculi, confluence, subject reduction and strong normalization when restricted to weak-elimination, implying the decidability of type-checking in this case as well as consistency. The case of strong elimination is left open.
  • Keywords
    decidability; CoQMTU; calculus of inductive constructions; complex type theory; decidable first-order theory; generic elimination principle; higher-order type theory; meta-theoretical properties; predicative hierarchy of universes; type-checking decidability; Algebra; Calculus; Context; Encoding; Kernel; Reactive power; Semantics; Calculus of Inductive Constructions; decidability; first-order theory; lambda calculus; strong normalization; type theory;
  • fLanguage
    English
  • Publisher
    ieee
  • Conference_Titel
    Logic in Computer Science (LICS), 2011 26th Annual IEEE Symposium on
  • Conference_Location
    Toronto, ON
  • ISSN
    1043-6871
  • Print_ISBN
    978-1-4577-0451-2
  • Electronic_ISBN
    1043-6871
  • Type

    conf

  • DOI
    10.1109/LICS.2011.37
  • Filename
    5970212