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# Course detail

## Polynomial Theory of Control

Course unit code: FSI-VTR-K
Type of course unit: compulsory
Level of course unit: Master's (2nd cycle)
Year of study: 2
Semester: summer
Number of ECTS credits:
 Learning outcomes of the course unit: Students will be made familiar with solving mathematical problems that occur in the theory of discrete linear control. Basic problems of this kind concern the synthesis of optimal control, which is reduced to searching for solutions of linear polynomial equations (as the transmission of a system can be expressed by using polynomials).
 Mode of delivery: 20 % face-to-face, 80 % distance learning
 Prerequisites: The knowledge of mathematics gained within the bachelor's study programme.
 Co-requisites: Not applicable.
 Recommended optional programme components: Not applicable.
 Course contents (annotation): The students will be provided with the principles of the algebraic theory of discrete linear control. The basic algebraic concepts and methods used in the theory will be discussed. The main interest will be focused on the study of polynomials, because they are the most important tools of the theory of discrete linear control. First, the fundamentals of the theory of rings and the theory of formal series will be expounded. This will be followed by the study of polynomials (as special cases of formal series) and polynomial matrices from the view-point of the theory of discrete linear control. This will be done with the help of the fundamental knowledge of the theory of rings.
 Recommended or required reading: V.Kučera: Algebraická teorie diskrétního lineárního řízení, Academia, Praha, 1978J.Karásek, J.Šlapal: Teorie okruhů pro diskrétní lineární řízení, FSI VUT v Brně, 2000 (učební text)J.Karásek, J.Šlapal: Teorie okruhů pro diskrétní lineární řízení, FSI VUT v Brně, 2000 (učební text)
 Planned learning activities and teaching methods: The course is taught through lectures explaining the basic principles and theory of the discipline.
 Assesment methods and criteria linked to learning outcomes: The graded course-unit credit is awarded on condition of having passed a written test at the end of the semester.
 Language of instruction: Czech
 Work placements: Not applicable.
 Course curriculum: Not applicable.
 Aims: The goal of the course is to acquaint students with the mathematical principles that form the basis of the algebraic theory of discrete linear control and that are used for solving problems of the theory.
 Specification of controlled education, way of implementation and compensation for absences: Since the attendance at lectures is not compulsory, it will not be checked, and compensation of possible absence will not be required.

Type of course unit:

Tuition: 9 hours, optionally doc. Mgr. Jaroslav Hrdina, Ph.D. 1. Introduction 2.-3. Rings 4.-5. Fields 6.-7. Formal power series 8.-9. Polynomials 10.-11. Polynomial fractions 12.-13. Polynomial matrices 17 hours, optionally doc. Mgr. Jaroslav Hrdina, Ph.D. 1. Introduction 2.-3. Rings 4.-5. Fields 6.-7. Formal power series 8.-9. Polynomials 10.-11. Polynomial fractions 12.-13. Polynomial matrices

The study programmes with the given course