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MAM603 Mathematics C 30.0 ECTS credits | |
TIMEPERIOD: LANGUAGE:Swedish EXAMINER T Gunnarsson Univ lekt PREREQUISITES MAM602 COURSE AIM The course aim is to give deeper knowledge and skills in some central mathematical theories and structures and to give training in independent mathematical work, to give a foundation for further studies, both in the form of courses and independent studies, in mathematics and subjects where mathematics is used, to give deeper insight in those parts of mathematics which are needed for independent application of mathematical methodology, to give such deeper knowledge that will benefit the teaching of mathematics at the gymnasium. CONTENTS The course Mathematics C, 20 credits, consists of a combination of courses, which can be choosen from the courses below, with the exception that one can not chose both the course Algebra 2 and the course discrete mathematics. Each semester only some of the couses are taught. For the "kandidatexamen" an independent work for 10 credits is required. It is also possible to do an independent work for 20 credits. This is required for the "magisterexamen". Courses 1. Real analysis 1, 5 credits 2. Real analysis 2, 5 credits 3. Complex analysis, 5 credits 4. Partial differential equations 2, 5 credits 5. Algebra 2, 5 credits 6. Discrete mathematics, 5 credits 7. Applied mathematics, 10 credits
After agreement from the examiner it is also possible to take other courses.
2. Real analysis 2, 5 credits
3. Complex analysis, 5 credits
4. Partial differential equations 2, 5 credits
The course deals mostly with three main types of second order partial differential equations: the Laplace´s equation, the wave equation and the heat equation. Initial and boundary value problems and their physical interpretation are discussed. Existence, uniqueness and stability of solutions are studied as well as different methods for finding the solutions.
5. Algebra 2, 5 credits
The course treats the general theory of algebraic structures such as groups, rings and fields. Notions like coset, ideal and isomorphism are given special emphacis. The course treats field extensions and possible geometric constructions. In particular it is shown why the classical problems "trisection of the angle", "the doubling of the cube" and the "squaring of the circle" are geometricaly unsolvable. Computer exercises with the program Magma are included in the course.
6. Discrete mathematics
The course treats the general theory of algebraic structures such as groups, rings and fields. Notions like coset, ideal and isomorphism are given special emphacies. These notions are applied to Boolean algebras, blockmodels, codes with a finite number of states, algorithms for networks, geometric constructions etc.
7. C-paper, 10 credits
The choice of topic has to be done in concensus with the examiner | |
15.00ECTS | |
Written exam | 7.50ECTS |
Written exam | 7.50ECTS |
COURSE LITERATURE See the individual courses. REMARKS Recommended prerequisites MAM602. For the C-paper the following holds: MAM602 or a corresponding course must be completed before work with the C-paper is started. Under 1996/97 the following courses will be given: 3. Complex analysis, 5. Algebra 2 and supervising for the C-paper (or CD-paper for those who choose to do a 20 credit paper) Course information from the department: http://www.sm.luth.se/math/education/ |
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