Opetus

Nimi Op Opiskelumuoto Aika Paikkakunta Järjestäjä
Mathematics of infectious diseases 10 Cr Luentokurssi 5.9.2019 - 15.12.2019
Nimi Op Opiskelumuoto Aika Paikkakunta Järjestäjä
Mathematics of infectious diseases 10 Cr Luentokurssi 6.9.2017 - 13.12.2017

Kohderyhmä

Optional course.

Master's Programme in Life Science Informatics is responsible for the course.

The course belongs to the Mathematics and Applied mathematics module.

The course is available to students from other degree programmes.

Edeltävät opinnot tai edeltävä osaaminen

BSc courses on differential equations, linear algebra, probability theory

Osaamistavoitteet

Modelling the dynamics of infectious diseases using a variety of mathematical techniques (differential equations, renewal equations, stochastic models, network models).

Ajoitus

Recommended time/stage of studies for completion: 1. or 2. year

Term/teaching period when the course will be offered: varying

Sisältö

This course is an introduction to mathematical modelling of the dynamics of infectious diseases in human and other populations. The topics include the basic models of epidemics (e.g. SIR); the basic reproduction number (R0); vaccination; the final size of an epidemic; persistence; the evolution of pathogens; diseases in small communities; time to extinction; epidemics in structured host populations; multi-level mixing (households); epidemics on networks. The course is given as a book-reading course based on a textbook that approaches much of the material via problem-solving. Lectures and exercise classes are combined; next to traditional lectures, also students present sections of the book and discuss the solutions of the problems.

Oppimista tukevat aktiviteetit ja opetusmenetelmät

Lectures, student presentations, problem solving

Oppimateriaali

O. Diekmann, H. Heesterbeek and T. Britton: Mathematical Tools for Understanding Infectious Disease Dynamics. Princeton University Press, 2012; ISBN-10: 0691155399.

Arviointimenetelmät ja -kriteerit

Exam and course activity (presentations and problem solving), Course will be graded with grades 1-5

Toteutus

Exam, other methods will be described later