TY - BOOK AU - Giménez,Eduardo AU - Paulin-Mohring,Christine ED - SpringerLink (Online service) TI - Types for Proofs and Programs: International Workshop TYPES’96 Aussois, France, December 15–19, 1996 Selected Papers T2 - Lecture Notes in Computer Science, SN - 9783540495628 AV - QA76.9.L63 U1 - 005.1015113 23 PY - 1998/// CY - Berlin, Heidelberg PB - Springer Berlin Heidelberg KW - Computer science KW - Logic design KW - Artificial intelligence KW - Computer Science KW - Logics and Meanings of Programs KW - Mathematical Logic and Formal Languages KW - Programming Languages, Compilers, Interpreters KW - Artificial Intelligence (incl. Robotics) N1 - Coercion synthesis in computer implementations of type-theoretic frameworks -- Verification of the interface of a small proof system in coq -- An implementation of the Heine-Borel covering theorem in type theory -- Detecting and removing dead-code using rank 2 intersection -- A type-free formalization of mathematics where proofs are objects -- Higman's lemma in type theory -- A proof of weak termination of typed ??-calculi -- Proof style -- Some algorithmic and proof-theoretical aspects of coercive subtyping -- Semantical BNF -- The internal type theory of a Heyting pretopos -- Inverting inductively defined relations in LEGO -- A generic normalisation proof for pure type systems -- Proving a real time algorithm for ATM in Coq -- Dependent types with explicit substitutions: A meta-theoretical development -- Type inference verified: Algorithm W in Isabelle/HOL -- Continuous lattices in formal topology -- Abstract insertion sort in an extension of type theory with record types and subtyping N2 - This book constitutes the thoroughly revised post-workshop proceedings of the first annual workshop held under the auspices of the ESPRIT Working Group 21900 TYPES in Aussois, France in December 1996. The 18 revised full papers presented in the book were carefully reviewed and selected from the 30 papers accepted for presentation at the workshop. All current aspects of type theory and type systems and their applications to program verification and theorem proving are addressed; the proof systems and theorem provers dealt with include Coq, LEGO, and Isabelle/HOL UR - http://dx.doi.org/10.1007/BFb0097782 ER -