FI:IA038 Types and Proofs - Course Information
IA038 Types and Proofs
Faculty of InformaticsSpring 2003
- Extent and Intensity
- 2/0. 3 credit(s) (plus extra credits for completion). Recommended Type of Completion: zk (examination). Other types of completion: k (colloquium), z (credit).
- Teacher(s)
- prof. RNDr. Jiří Zlatuška, CSc. (lecturer)
- Guaranteed by
- prof. RNDr. Mojmír Křetínský, CSc.
Department of Computer Science – Faculty of Informatics
Contact Person: prof. RNDr. Jiří Zlatuška, CSc. - Timetable
- Mon 9:00–10:50 B410
- Prerequisites (in Czech)
- ! I038 Types and Proofs
- Course Enrolment Limitations
- The course is only offered to the students of the study fields the course is directly associated with.
- fields of study / plans the course is directly associated with
- Applied Informatics (programme FI, N-AP)
- Informatics (programme FI, B-IN)
- Informatics (programme FI, M-IN)
- Informatics (programme FI, N-IN)
- Upper Secondary School Teacher Training in Informatics (programme FI, M-IN)
- Upper Secondary School Teacher Training in Informatics (programme FI, M-SS)
- Upper Secondary School Teacher Training in Informatics (programme FI, N-SS)
- Course objectives
- This course delivers focuses on the correspondence between proof theory and typed lambda-calculus and its generalization to the correspondence between computations as proof simplifications and program specifications as types in various formal settings. The contents of the course is relevant for work in many areas of theoretical computer science.
- Syllabus
- meaning and denotation in logic, tarski and Heyting.
- natural deduction: calculus, rules, computational interpretation.
- Curry-Howard isomorphism: lambda-calculus, operational and denotational interpretation, conversion, isomorphism.
- Normalization theorem: Church-Rosser property, weak normalization, strong normalization.
- Sequent calculus: structural rules, intuitionistic version, identities, logical rules, properties of the cut-free system, translation between sequent calculus and natural deduction.
- Strong normalization theorem: reducibility and its properties.
- Gödels system T, calculus, normalization, expressive power.
- Coherent spaces, stabil functions, paralel disjunction, product and function spaces, denotational semantics of System T.
- Sums in natural deduction: problems, standard conversion, commuting conversions, functional calculus.
- System F: calculus, simple types, free structures, inductive types, Curry-Howard isomorphism, strong normalization.
- Coherent semantics of the sum; cut-elimination theorem; representation.
- Literature
- Language of instruction
- Czech
- Enrolment Statistics (Spring 2003, recent)
- Permalink: https://is.muni.cz/course/fi/spring2003/IA038