Advanced Topics in Mathematical Analysis
Course: Applied mathematics
Structural unit: Faculty of Computer Science and Cybernetics
Title
Advanced Topics in Mathematical Analysis
Code
ДВВ.01.02
Module type
Обов’язкова дисципліна для ОП
Educational cycle
Second
Year of study when the component is delivered
2022/2023
Semester/trimester when the component is delivered
3 Semester
Number of ECTS credits allocated
2
Learning outcomes
PLO4. Be able to determine the type of data integration required for a task.
PLO8. Communicate effectively on information, ideas, problems and solutions with professionals and society at large.
Form of study
Prerequisites and co-requisites
Understand the main topics of mathematical analysis, algebra, differential equations, equations of mathematical physics, and functional analysis. Be able to solve standard problems in the aforementioned areas of mathematics.
Course content
The course introduces students to the theory of generalized solutions of operator equations, specifically the simplest schemes of generalized solutions of linear operator equations, a priori estimates for a linear continuous operator, the application of the theory to problems in mathematical physics, and the general scheme of generalized solutions of linear and nonlinear operator equations.
Recommended or required reading and other learning resources/tools
1. D.A. Klyushin, S.I. Lyashko, D.A. Nomirovskii, Yu.I. Petunin, V.V .Semenov Generalized solutions of operator equations and extreme elements. Springer, 2012. – 202p.
2. Tymchyshyn I.B., Nomirovskii D.A. Generalized Solvability of a Parabolic Model Describing Transfer Processes in Domains with Thin Inclusions // Differential Equations. – 2021, 57(8). – P. 1053–1062.
3. Kolmogorov A.M., Fomin S.V. Elementy teoriyi funktsiy ta funktsional'noho analizu. — Kyiv: Vyshcha shkola, 1974. — 456 p.
4. Gelbaum Bernard R., Olmsted John M. H. Counterexamples in Analysis. – Courier Corporation, 2003. – 195 p.
5. Rajwade A. R., Bhandari A. K. Surprises and Counterexamples in Real Function Theory. – HINDUSTAN, 2007. – 301 p.
6. Wise Gary L., Hall Eric B. Counterexamples in Probability and Real Analysis. – Oxford University Press, 1993. – 224 p.
7. Schilling René L., Kühn Franziska Counterexamples in Measure and Integration. – Cambridge University Press, 2021. – 431 p.
Planned learning activities and teaching methods
lectures, academic consultations, tests, quizzes, exams, and homework
Assessment methods and criteria
Semester assessment:
1. Test – 30 points
2. Combined grade for practical classes – 30 points
3. Additional points – up to 10 points
Final assessment in the form of an exam: – 40 points
Conditions for students' admission to the final exam: no less than 36 points for the semester assessment. Conditions for receiving a general positive grade for the course: no less than 24 points in the final exam.
Language of instruction
Ukrainian
Lecturers
This discipline is taught by the following teachers
Departments
The following departments are involved in teaching the above discipline