Teaching code

4S001096

Teacher

Peter Michael Schuster

Coordinator

Peter Michael Schuster

Credits

6

Language

English

Scientific Disciplinary Sector (SSD)

MAT/01 - MATHEMATICAL LOGIC

Period

Semester 1 dal Oct 3, 2022 al Jan 27, 2023.

Lessons timetable Moodle Seminars 0

Learning objectives

The course is intended to introduce into the interaction between syntax (formal languages and calculi) and semantics (interpretations and models) as is fundamental for abstract mathematics and theoretical informatics.

Prerequisites and basic notions

Bachelor's degree in mathematics (pure, applied, ...). Alternatively, a bachelor's degree in some related subject (computer science, statistics, ...) if the emphasis of the studies was put on formal and mathematical methods.

Program

Formal languages of first-order predicate logic.
Calculus of natural deduction.
Minimal, intuitionistic and classical logic.
Soundness and completeness theorems.
Compactness and Löwenheim-Skolem theorems.
Models and theories.

Bibliography

Didactic methods

All lectures will be held in lecture hall. Additional homework exercises will be assigned and partially discussed at lectures.

Learning assessment procedures

The exam consists of a single oral exam with open questions and marks out of thirty. Exam methods are not differentiated between attending and non-attending students.

Evaluation criteria

The exam aims to verify the student's full maturity about proof techniques and the ability to read and understand advanced topics of mathematical logic.

Criteria for the composition of the final grade

The final grade consists of the outcome of the sole oral exam.

Exam language

English