MU:MU01003 Mathematical Analysis III - Course Information
MU01003 Mathematical Analysis III
Mathematical Institute in OpavaWinter 2010
- Extent and Intensity
- 4/0/0. 5 credit(s). Type of Completion: zk (examination).
- Teacher(s)
- Vladimír Averbuch, DrSc. (lecturer)
- Guaranteed by
- Vladimír Averbuch, DrSc.
Mathematical Institute in Opava - Prerequisites (in Czech)
- MU01002 Mathematical Analysis II && ( MU01006 Algebra II || MU01016 Seminar on Mathematics II ) && MU01903 Mathematical Analysis III - Ex
- Course Enrolment Limitations
- The course is also offered to the students of the fields other than those the course is directly associated with.
- fields of study / plans the course is directly associated with
- Applied Mathematics (programme MU, B1101)
- Applied Mathematics in Risk Management (programme MU, B1102)
- Astrophysics (programme FPF, B1701 Fyz)
- Geometry (programme MU, M1101)
- Mathematical Analysis (programme MU, M1101)
- Mathematical Methods in Economics (programme MU, B1101)
- Mathematics (programme MU, B1101)
- Theoretical Physics (programme FPF, M1701 Fyz)
- Secondary School Teacher Traning in Physics and Mathematics (programme FPF, M1701 Fyz)
- Secondary School Teacher Training in Mathematics (programme FPF, M7504)
- Secondary school teacher training in general subjects with specialization in Mathematics (programme FPF, M7504)
- Course objectives
- The main attention of the third part of the basic course of mathematical analysis is given to normed spaces, Fréche and Gateaux derivatives, chain rule, inverse function theorem and implicite function theorem, higher derivatives, Taylor formula and conditions of extremum of functions, including Lagrange theorem on multiplicators.
- Syllabus
- 1. Normed spaces (normed speces, topology of a normed space, equivalent norms, equivalence of all the norms in finite-dimensional spaces, the natural topology of a finite-dimensional space, basic normes, product of normed spaces, compact sets in a finite-dimensional space, continuity of some basic mappings).
2. The first derivative (Fréche derivative, Gateaux derivative, directional derivative, differential, their basic properties and relations between them, derivatives of basic mappings, Chain Rule and its corollaries, partial derivatives, continuous differentiability).
3. Theorems on inverse function and on imlicite function (Banach spaces, contraction lemma, Theorem on inverse function, Theorem on imlicite function).
4. Higher derivatives (definition and properties of higher derivatives, symmetry of higher derivatives, higher partial derivatives, Taylor formula, extreme problems without constrains, Fermat theorem, necessary conditions and sufficient conditions of the second order for local extremum, extreme problems with constrains, tangent vectors and normal vectors, necessary condition of local extremum in problems with constrains in terms of normal vectors, Lagrange Theorem on multiplicators).
- 1. Normed spaces (normed speces, topology of a normed space, equivalent norms, equivalence of all the norms in finite-dimensional spaces, the natural topology of a finite-dimensional space, basic normes, product of normed spaces, compact sets in a finite-dimensional space, continuity of some basic mappings).
- Literature
- recommended literature
- V. I. Averbuch, M. Málek. Matematická analýza III, IV. MÚ SU, Opava, 2003. URL info
- W. Rudin. Analýza v reálném a komplexním oboru. Academia, Praha, 1987. info
- K. Rektorys a spolupracovníci. Přehled užité matematiky. SNTL, Praha, 1968. info
- V. Jarník. Diferenciální počet I. ČSAV, Praha, 1963. info
- V. Jarník. Diferenciální počet II. ČSAV, Praha, 1963. info
- Language of instruction
- Czech
- Further comments (probably available only in Czech)
- The course can also be completed outside the examination period.
- Enrolment Statistics (Winter 2010, recent)
- Permalink: https://is.slu.cz/course/sumu/winter2010/MU01003