Application

Application (open)

Key Information

Name:
Mathematics
Degree:
Master of Science
Teaching language:
English, German (see FAQ)
Standard period of studies:
4 semesters
Start of studies:
Winter and summer semester
Admission:
Restricted
(Application to the faculty)

Requirements

  • Bachelor's Degree in Mathematics or related subject with a total of at least 180 ECTS credits
  • Eligibility:
    • at least 90 ECTS credits in mathematics, including:
      • at least 16 ECTS credits in real analysis
      • at least 16 ECTS credits in analytical geometry and linear algebra
      • a total of at least 8 ECTS credits in the following topics:
        • analysis on manifolds
        • functional analysis
        • complex analysis
        • advanced algebra (group-,ring-, field theory, Galois theory)
      • at least 8 ECTS credits in measure and probability theory
      • at least 8 ECTS credits in numerical mathematics
      • further 34 ECTS credits in mathematics at a level exceeding the above mentioned courses
  • Language requirements (proof must not be older than 2 years): English proficiency at level C1 or higher (e.g. IELTS Band 7,0 or TOEFL iBT 94), alternatively German proficiency at level C1 or higher (e.g. German Abitur certificate), alternatively, evidence from a previous university certifying that English/German was the language of instruction in your previous studies, provided these studies were completed no more than 2 years ago.


The contents of real analysis at the University of Göttingen are listed below.

Courses that contain these topics will be counted towards your Master’s Degree application in the area “real analysis”, only. This means they count up to at most 16 ECTS credits.

Contents of real analysis:

  1. Logic. Sets, equivalence relation, inequalities and orderings, maps.
  2. The real numbers. Supremum and infimum. Monotone sequences. Convergence of sequences, Chauchy sequences. Real numbers are complete.
  3. Continuity of real functions. Intermediate value theorem. Inverse functions. Convergence and uniform convergence of function sequences. Direct comparison test.
  4. Differentiability of real functions. Mean value theorem. Taylor’s Theorem. Find minimum and maximum values.
  5. Series, absolute and conditional convergence. Geometric series, harmonic series. Critieria for convergence. Series of functions, component wise differentiation and integration. Powerseries, radius of convergence.
  6. Elementary functions: exponential map, trigonometric functions, their inverses.
  7. Integrals Fundamental theorem of calculus. Antiderivative. Improper integrals. Tools: partial integration, substitution. Leibniz’ Rule for integrals.
  8. Topological spaces, continuity, compactness. Metric spaces, completeness. Banach fixed point theorem. Normed vector spaces.
  9. Differential maps, partial differentiation. Taylor ‘s Theorem. Inverse function theorem. Implicit function theorem. Extreme values, Lagrange multipliers.
  10. Lebesgue integral. Dominated convergence theorem. Transformation formula. Fubini’s Theorem.
  11. Submanifolds of R^n. Integration over submanifolds. Gaussian integrals.
  12. Ordinary differential equations. Local existence and uniqueness. Linear differential equations and systems of linear differential equations. Fundamental solutions. Variation of constants. Linear differential equations with constant coefficients.

The contents of analytical geometry and linear algebra at the University of Göttingen are listed below.

Courses that contain these topics will be counted towards your Master’s Degree application in the area “analytical geometry and linear algebra”, only. This means they count up to at most 16 ECTS credits. Contents of analytical geometry and linear algebra:

  1. Basic knowledge: Sets and maps, proofs: Proof by contradiction, Induction. Basics of groups, rings (in particular polynomial rings), fields; Introduction of complex numbers an residue fields.
  2. Structures of vector spaces: linear dependence, basis, dimension; linear maps and fundamental theorem of homomorphisms.
  3. Matrices I: Gaussian algorithm, trace and determinant, permutations, Cramer rule, solving of linear systems.
  4. Eigenvalues: Characteristic polynomial, diogonalisability, Cayley-Hamilton theorem.
  5. Euclidean geometry, geometry of unitary transformations Scalar products and norms, orthogonality, normal maps, euclidean and unitary vector spaces.
  6. Quadratic and hermitian forms, Principal axis theorem, Sylvester's law of inertia
  7. Affine and projective geometry
  8. Matrices II: Jordan normal form, matrix exponentials
  9. Multilinear algebra: tensor products and tensor algebras, exterior product.

Application procedure

The Master's programme starts in the summer and winter semester. The application is to be submitted via the online portal of the department. The application must be received by the university with the required application documents by 15.07. (cut-off deadline) for the winter semester and by 15.01. (cut-off deadline) for the summer semester.

We are offering an additional early application deadline (15.11.2022) this semester with an earlier feedback on your application. The chances of being admitted to our Master's degree programme are independent of the use of the early application deadline.

The application is only valid for the semester applied for.

The application must include the following documents:

  • Short Curriculum Vitae briefly describing your education career (please upload a PDF document; in German or English). Please include your date of birth and your name as given in your passport. Preferably, use the following form: Europass CV (extern link)
  • Copy of your degree certificates for all academic degrees earned (please upload a PDF document; original plus translation into German or English)
  • Syllabus/course descriptions for all degree programmes resp. mathematics courses completed or not yet completed as PDF or alternatively hyperlinks to syllabus/course descriptions for all degree programmes resp. mathematics courses completed or not yet completed
  • Transcripts of records for all academic studies completed or not yet completed (please upload a PDF document; original plus translation into German or English)
  • Proof of language proficiency (please upload a PDF document)

If you are already enrolled at the University of Göttingen, please consider the following:

  • As soon as it is likely that you will complete the Bachelor's Degree (in mathematics) in the current semester, you should apply.
  • Please re-register regularly for the programme that you are currently enrolled in. The enrollment to the Master's Degree programme in mathematics is being done in form of a change of the degree course after being admitted successfully.

Online Application System

Apply now

Frequently Asked Questions (FAQ)

You can apply with your current transcript of records but you should hand in final degree certificates preferably by the time of enrolment, this is by the end of September for winter semesters and by the end of March for summer semesters but not later than the 15th of November for winter semesters and not later than the 15th of May for summer semesters.
No, you have to hand in these at the time of application.
With the early application deadline, we offer applicants the service of receiving feedback on their application at an earlier stage.
Except for an earlier feedback on the application, you will not experience any advantages or disadvantages as a result of the early application date. The chances of being admitted to our Master's degree programme are independent of the use of the early application deadline.
Please note that we teach all mathematics courses in English. Not all minor subjects are taught in English, so the choice of minor subjects is limited if you wish to take only English courses.
No, since the majority of our courses are taught in English language only. In particular all mathematics courses are taught in English.
No, we cannot check beforehand whether you are eligible.

Further Questions

If you need help or have any questions about the application process, please feel free to contact us by email: