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# Details for Course FMAN60F Optimization

General
• FMAN60F
• Temporary
Course Name
• Optimization
Course Extent
• 6
Type of Instruction
• Course given jointly for second and third cycle
• 7151 (Centre of Mathematical Sciences / Mathematics)
•  -01-27
• FN1/Anders Gustafsson

## Current Established Course Syllabus

General
• English
• Every autumn semester
Aim
• In many applications of mathematics, e.g. image analysis, control theory and time series analysis, an essential step is to choose the parameters in a model so that it fits given data as well as possible. One wants to minimize the error, measured in some way, which may be considered as a function of several variables – the parameters – that may have to satisfy further conditions – constraints.
The aim of the course is to make the doctoral student familiar with the most common methods for solving optimization problems in which the parameters may vary continuously.
Contents
• Quadratic forms and matrix factorisation. Convexity. The theory of optimization with and without constraints: Lagrange functions, Kuhn-Tucker theory. Duality. Methods for optimization without constraints: line search, steepest descent, Newton methods, conjugate directions, non-linear least squares optimization. Methods for optimization with constraints: linear optimization, the simplex method, quadratic programming, penalty and barrier methods.
Knowledge and Understanding
• For a passing grade the doctoral student must
• be familiar with and, in his/her own words, be able to describe the optimization algorithms, for problems with and without constraints, encountered in the course, and their properties.

be familiar with the theory of convex sets and convex functions, and be able to state and derive the most important theorems on convexity.

be aware of how to make use of convexity in the treatment of an optimization problem.

be familiar with Kuhn-Tucker Theory and be able to state and derive the most important theorems therein.
Competences and Skills
• For a passing grade the doctoral student must
• be able to demonstrate an ability to solve optimization problems within the framework of the course.

be able to demonstrate an ability to handle optimization problems using a computer.

be able to demonstrate an ability to, in the context of problem solving, develop the theory somewhat further.

be able to describe the connections between different concepts in the course, with proper terminology and in a well structured and logically consistent manner,.

with proper terminology, suitable notation, in a well structured way and with clear logic be able to describe the solution to a mathematical problem and the theory within the framework of the course.
Judgement and Approach
• For a passing grade the doctoral student must
Types of Instruction
• Lectures
• Seminars
• Laboratory exercises
• Exercises
Examination Formats
• Written exam
• Written assignments
• Programming exercise with written report.
• Failed, pass
Assumed Prior Knowledge
• Calculus and linear algebra. Sufficient background is provided, e.g., by the courses FMAA05, FMA430, and FMAF05 or FMAF10.
Selection Criteria
Literature
• Böiers, L.: Mathematical Methods of Optimization. 2010. ISBN 9789144070759.
Further Information
• Replaces FMA051F.
Course code
• FMAN60F
•  -01-27
• FN1/Anders Gustafsson

## All Established Course Syllabi

1 course syllabus.

Valid from First hand in Second hand in Established
Autumn 2019 2013‑12‑19 08:26:56 2014‑01‑20 11:42:22 2014‑01‑27

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