184.711 Proof Systems in Modal Logic
This course is in all assigned curricula part of the STEOP.
This course is in at least 1 assigned curriculum part of the STEOP.

2017S, VU, 2.0h, 3.0EC, to be held in blocked form

Properties

  • Semester hours: 2.0
  • Credits: 3.0
  • Type: VU Lecture and Exercise

Aim of course

 

Acquiring of basic knowledge about modal logics and their proof methods. Didactic procedure:

  • Lecture
  • Exercise part: assignment of students comprise
    • processing of simple exercises by students (e.g., complete a proof presented in the lecture),
    • research of literature,
    • preparation and presentation of a 30 minute talk,
    • discussion of talks and solutions

.News:

  • Attention: begin of first lecture: March 1!



Subject of course

Different proof systems for basic modal logics, like K, S4, S5, are investigated. We mainly study tableau systems and their close relatives, Gentzen calculi. Furthermore, important properties of the considered logics are studied.

Additional information

ECTS breakdown: 3 ECTS = 75 Hours

  • Lecture 15h
  • Lecture introduction 0.5h
  • Solving the exercises 10h
  • Preparing the presentation 20h
  • Presentation of exercises solutions and talks 9h
  • Preparation for exam 20h
  • Oral exam 0.5h

Lecturers

Institute

Course dates

DayTimeDateLocationDescription
Wed10:00 - 13:0001.03.2017 - 07.06.2017Seminarraum FAV EG C (Seminarraum Gödel) Lecture
Wed15:00 - 18:0003.05.2017Seminarraum FAV EG B (Seminarraum von Neumann) Lecture
Wed16:00 - 19:0010.05.2017Seminarraum FAV EG B (Seminarraum von Neumann) Lecture
Wed15:00 - 18:0017.05.2017 - 07.06.2017Seminarraum FAV EG B (Seminarraum von Neumann) Lecture
Fri13:00 - 16:0019.05.2017Seminarraum FAV EG C (Seminarraum Gödel) Replacement unit
Fri13:00 - 15:0026.05.2017Seminarraum FAV EG C (Seminarraum Gödel) Lecture
Fri13:00 - 17:0002.06.2017Seminarraum FAV EG C (Seminarraum Gödel) Lecture
Fri13:00 - 17:0009.06.2017Seminarraum FAV EG B (Seminarraum von Neumann) Lecture
Wed10:00 - 12:0014.06.2017Seminarraum FAV EG C (Seminarraum Gödel) Presentations
Wed17:00 - 20:0014.06.2017Seminarraum FAV EG B (Seminarraum von Neumann) Lecture
Proof Systems in Modal Logic - Single appointments
DayDateTimeLocationDescription
Wed01.03.201710:00 - 13:00Seminarraum FAV EG C (Seminarraum Gödel) Lecture
Wed08.03.201710:00 - 13:00Seminarraum FAV EG C (Seminarraum Gödel) Lecture
Wed15.03.201710:00 - 13:00Seminarraum FAV EG C (Seminarraum Gödel) Lecture
Wed22.03.201710:00 - 13:00Seminarraum FAV EG C (Seminarraum Gödel) Lecture
Wed29.03.201710:00 - 13:00Seminarraum FAV EG C (Seminarraum Gödel) Lecture
Wed05.04.201710:00 - 13:00Seminarraum FAV EG C (Seminarraum Gödel) Lecture
Wed26.04.201710:00 - 13:00Seminarraum FAV EG C (Seminarraum Gödel) Lecture
Wed03.05.201710:00 - 13:00Seminarraum FAV EG C (Seminarraum Gödel) Lecture
Wed03.05.201715:00 - 18:00Seminarraum FAV EG B (Seminarraum von Neumann) Lecture
Wed10.05.201710:00 - 13:00Seminarraum FAV EG C (Seminarraum Gödel) Lecture
Wed10.05.201716:00 - 19:00Seminarraum FAV EG B (Seminarraum von Neumann) Lecture
Wed17.05.201710:00 - 13:00Seminarraum FAV EG C (Seminarraum Gödel) Lecture
Wed17.05.201715:00 - 18:00Seminarraum FAV EG B (Seminarraum von Neumann) Lecture
Fri19.05.201713:00 - 16:00Seminarraum FAV EG C (Seminarraum Gödel) Replacement unit
Wed24.05.201710:00 - 13:00Seminarraum FAV EG C (Seminarraum Gödel) Lecture
Wed24.05.201715:00 - 18:00Seminarraum FAV EG B (Seminarraum von Neumann) Lecture
Fri26.05.201713:00 - 15:00Seminarraum FAV EG C (Seminarraum Gödel) Lecture
Wed31.05.201710:00 - 13:00Seminarraum FAV EG C (Seminarraum Gödel) Lecture
Wed31.05.201715:00 - 18:00Seminarraum FAV EG B (Seminarraum von Neumann) Lecture
Fri02.06.201713:00 - 17:00Seminarraum FAV EG C (Seminarraum Gödel) Lecture
Course is held blocked

Examination modalities

  • exercises
  • presentation
  • oral exam

Course registration

Not necessary

Curricula

Study CodeObligationSemesterPrecon.Info
066 931 Logic and Computation Mandatory elective

Literature

Melvin Fitting: Proof Methods for Modal and Intuitionistic Logics

Previous knowledge

Basic knowledge of classical logic.

Language

English