MAT3000 ¨C Numbers, spaces and linearity

Course description

• Course content
• Learning outcome
• Admission
• Prerequisites

• Overlapping courses
• Teaching
• Examination
• Evaluation

Course content

Euclid's algorithm, prime factorization, congruence, Fermat's little theorem, Euler's theorem, Wilson's theorem, quadratic rests and quadratic sums, distribution of primes. General vector spaces, linear transformations, matrix representations and change of basis, the Caylon-Hamilton theorem, inner product spaces, spectral theory, Schur triangularization, Jordan normal form, multilinear mappings. Some applications chosen from cryptography, geometry (geometric mappings) and analysis (differential equations, discrete Fourier analysis) are also covered.

Learning outcome

You will first be introduced to classical number theory. Then the elementary linear algebra you already have learned will be developped further in some greater generality (by considering vector spaces over fields, with emphasis on the real and the complex cases). The purpose is to provide you with a thourough understanding of the concepts and of the main results, which are of fundamental importance in most areas of modern mathematics. The abstract theory is illustrated with several concrete applications.

Admission

Students who are admitted to study programmes at UiO must each semester register which courses and exams they wish to sign up for in Studentweb.

If you are not already enrolled as a student at UiO, please see our information about admission requirements and procedures.

Prerequisites

Formal prerequisite knowledge

In addition to fulfilling the Higher Education Entrance Qualification, applicants have to meet the following special admission requirements:

• Mathematics R1 (or Mathematics S1 and S2) + R2

And in addition one of these:

• Physics (1+2)
• Chemistry (1+2)
• Biology (1+2)
• Information technology (1+2)
• Geosciences (1+2)
• Technology and theories of research (1+2)

The special admission requirements may also be covered by equivalent studies from Norwegian upper secondary school or by other equivalent studies (in Norwegian).

Recommended previous knowledge

The course follows on from MAT1100 ¨C Calculus, MAT1110 ¨C Calculus and Linear Algebra and MAT1120 ¨C Linear Algebra. It will be useful to have taken MAT2200 ¨C Groups, Rings and Fields, but this is not a prerequisite for the course.