Analytic Tableaux for Simple Type Theory and its First-Order Fragment
نویسندگان
چکیده
We study simple type theory with primitive equality (STT) and its first-order fragment EFO, which restricts equality and quantification to base types but retains lambda abstraction and higher-order variables. As deductive system we employ a cut-free tableau calculus. We consider completeness, compactness, and existence of countable models. We prove these properties for STT with respect to Henkin models and for EFO with respect to standard models. We also show that the tableau system yields a decision procedure for three EFO fragments.
منابع مشابه
Extended First-Order Logic
We consider the EFO fragment of simple type theory, which restricts quantification and equality to base types but retains lambda abstractions and higher-order variables. We show that this fragment enjoys the characteristic properties of first-order logic: complete proof systems, compactness, and countable models. We obtain these results with an analytic tableau system and a concomitant model ex...
متن کاملComplete Cut-Free Tableaux for Equational Simple Type Theory
Church’s type theory [11] is a basic formulation of higher-order logic. Henkin [13] found a natural class of models for which Church’s Hilbert-style proof system turned out to be complete. Equality, originally expressed with higher-order quantification, was later identified as the primary primitive of the theory [14, 3, 1]. In this paper we consider simple type theory with primitive equality bu...
متن کاملCombining Theories Sharing Dense Orders
The Nelson-Oppen combination method combines decision procedures for first-order theories satisfying certain conditions into a single decision procedure for the union theory. The Nelson-Oppen combination method can be applied only if the signatures of the combined theories are disjoint. Combination tableaux (C-tableaux) are an extension of Smullyan tableaux for combining first-order theories wh...
متن کاملOn a Decidable Generalized Quantifier Logic Corresponding to a Decidable Fragment of First-Order Logic
Van Lambalgen (1990) proposed a translation from a language containing a generalized quantifier Q into a first-order language enriched with a family of predicates Rs, for every arity i (or an infinitary predicate R) which takes Qz~(z, yl, . . . , y,~) to Vz(R(z, yl,..., g,~) --" ~b(x, Yl,..., Y,~)) (gl . . . . . g~ are precisely the free variables of Qzq~). The logic of Q (without ordinary quan...
متن کاملA Tableau-Based Decision Procedure for a Fragment of Graph Theory Involving Reachability and Acyclicity
We study the decision problem for the language DGRA (directed graphs with reachability and acyclicity), a quantifier-free fragment of graph theory involving the notions of reachability and acyclicity. We prove that the language DGRA is decidable, and that its decidability problem is NP -complete. We do so by showing that the language enjoys a small model property : If a formula is satisfiable, ...
متن کاملذخیره در منابع من
با ذخیره ی این منبع در منابع من، دسترسی به آن را برای استفاده های بعدی آسان تر کنید
عنوان ژورنال:
- Logical Methods in Computer Science
دوره 6 شماره
صفحات -
تاریخ انتشار 2010