Course detail
Mathematical Logic
FSI-SMLAcad. year: 2025/2026
In the course, the basics of propositional and predicate logics will be taught. First, the students will get acquainted with the syntax and semantics of the logics, then the logics will be studied as formal theories with an emphasis on formula proving. The classical theorems on correctness, completeness and compactness will also be dealt with. After discussing the prenex forms of formulas, some properties and models of first-order theories will be studied. We will also deal with the undecidability of first-order theories resulting from the well-known Gödel incompleteness theorems.
Language of instruction
Number of ECTS credits
Mode of study
Guarantor
Department
Entry knowledge
Rules for evaluation and completion of the course
The course unit credit is awarded on condition of having attended the seminars actively and passed a written test. The exam has a written and an oral part. The written part tests student's ability to deal with various problems using the knowledge and skills acquired in the course. In the oral part, the student has ro prove that he or she has mastered the related theory.
The attendance at seminars is required and will be checked regularly by the teacher supervising a seminar. If a student misses a seminar due to excused absence, he or she will receive problems to work on at home and catch up with the lessons missed.
Aims
The aim of the course is to acquaint students with the basic methods of reasoning in mathematics. The students will learn about general principles of predicate logic and, consequently, acquire the ability of exact mathematical reasoning and expression. They will understand the general principles of construction of mathematical theories and proofs. The course will contribute students to better acquiring logical reasonong in mathematics and thus to better understanding mathematical knowledge.,
The students will acquire the ability of understanding the principles of axiomatic mathematical theories and the ability of exact (formal) mathematical expression. They will also learn how to deduct, in a formal way, new formulas and to prove given ones. They will realize the efficiency of formal reasonong and also its limits.
Study aids
Prerequisites and corequisites
Basic literature
E.Mendelson, Introduction to Mathematical Logic, Chapman&Hall, 2001 (EN)
Recommended reading
J.Rachůnek, Logika, skriptum PřF UP Olomouc, 1986 (CS)
Vítězslav Švejnar, Logika - neúplnost,složitost a nutnost, Academia Praha, 2002 (CS)
Classification of course in study plans
- Programme N-MAI-P Master's 1 year of study, summer semester, compulsory
- Programme MITAI Master's
specialization NSEC , 0 year of study, summer semester, elective
specialization NISY up to 2020/21 , 0 year of study, summer semester, elective
specialization NNET , 0 year of study, summer semester, elective
specialization NMAL , 0 year of study, summer semester, elective
specialization NCPS , 0 year of study, summer semester, elective
specialization NHPC , 0 year of study, summer semester, elective
specialization NVER , 0 year of study, summer semester, elective
specialization NIDE , 0 year of study, summer semester, elective
specialization NISY , 0 year of study, summer semester, elective
specialization NEMB , 0 year of study, summer semester, elective
specialization NSPE , 0 year of study, summer semester, elective
specialization NEMB , 0 year of study, summer semester, elective
specialization NBIO , 0 year of study, summer semester, elective
specialization NSEN , 0 year of study, summer semester, elective
specialization NVIZ , 0 year of study, summer semester, elective
specialization NGRI , 0 year of study, summer semester, elective
specialization NADE , 0 year of study, summer semester, elective
specialization NISD , 0 year of study, summer semester, elective
specialization NMAT , 0 year of study, summer semester, elective
Type of course unit
Lecture
Teacher / Lecturer
Syllabus
2. Propositions and their truth, logic operations
3. Language, formulas and semantics of propositional calculus
4. Principle of duality, applications of propositional logic
5. Formal theory of the propositional logic
6. Provability in propositional logic, completeness theorem
7. Language of the (first-order) predicate logic, terms and formulas
8. Semantic of predicate logics
9. Axiomatic theory of the first-order predicate logic
10.Provability in predicate logic
11.Prenex normal forms, first-order theories and their models
12. Theorems on compactness and completeness
13.Undecidability of first-order theories, Gödel's incompleteness theorems
Exercise
Teacher / Lecturer
Syllabus
1. Sentences, propositional connectives, truth tables,tautologies and contradictions
2. Duality principle, applications of propositional logic
3. Complete systems and bases of propositional connectives
4. Independence of propositional connectives, axioms of propositional logic
5. Deduction theorem and proving formulas of propositional logic
6. Terms and formulas of predicate logics
7. Interpretation, satisfiability and truth
8. Axioms and rules of inference of predicate logic
9. Deduction theorem and proving formulas of predicate logic
10. Transforming formulas into prenex normal forms
11.First-order theories and some of their models
12.Theorems on completeness and compactness
13. Undecidability of first-order theories, Gödel's incompleteness theorems