Inhalt
[ 201WIMSMVLU20 ] UE Manyvalued Logic
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Es ist eine neuere Version 2023W dieser LV im Curriculum Master's programme Artificial Intelligence 2024W vorhanden. |
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Workload |
Education level |
Study areas |
Responsible person |
Hours per week |
Coordinating university |
1,5 ECTS |
B3 - Bachelor's programme 3. year |
Mathematics |
Thomas Vetterlein |
1 hpw |
Johannes Kepler University Linz |
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Detailed information |
Original study plan |
Bachelor's programme Technical Mathematics 2022W |
Objectives |
Support to achieve the goals of the corresponding course
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Subject |
Basics of lattice theory, model-theoretic definition of propositional logics, Hilbert-style proof systems, soundness and completeness, classical propositional logic, boolean algebras, t-norm based many-valued logics, residuated lattices, basic Logic, BL-algebras, Lukasiewicz logic, MV-algebras.
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Criteria for evaluation |
Presentation of homework
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Methods |
Weekly exercise sheets as homework, discussion of the solutions.
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Language |
English and French |
Changing subject? |
No |
Further information |
Until term 2020S known as: TM1WMUEFUZL UE Fuzzy Logic
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Earlier variants |
They also cover the requirements of the curriculum (from - to) TM1WMUEFUZL: UE Fuzzy logic (1998W-2020S)
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On-site course |
Maximum number of participants |
25 |
Assignment procedure |
Direct assignment |
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