dc.rights.license | CC-BY-NC-ND | |
dc.contributor.advisor | Sleijpen, G.L.G. | |
dc.contributor.author | Broeders, E.J. | |
dc.date.accessioned | 2015-10-21T17:00:31Z | |
dc.date.available | 2015-10-21T17:00:31Z | |
dc.date.issued | 2015 | |
dc.identifier.uri | https://studenttheses.uu.nl/handle/20.500.12932/28733 | |
dc.description.abstract | This thesis deals with eigenvalue optimization problems and some methods
which are applicable in solving those kind of problems. The goal is to develop
a novel algorithm which can solve large instances of eigenvalue optimization
problems.
In the second chapter is shown how semidefinite optimization problems can
be turned into eigenvalue optimization problems through a rotation of basis.
Although the relation between semidefinite optimization and eigenvalue opti-
mization is not new, this approach where a semidefinite optimization problem
is turned into a full eigenvalue optimization problem is.
In the third chapter SASPA (Subspace Accelerated Sensitive Pole Algorithm)
is used to compute the intersection points of eigencurves. This is a novel appli-
cation which allows to compute such intersection points with less computation
time than through bisection methods. Moreover, SASPA also works for non-
simple eigenvalues.
The fourth chapter deals with developing a novel algorithm to solve eigen-
value optimization problems based on gradients. This algorithm is able to handle
large sparse problems within reasonable computation time. | |
dc.description.sponsorship | Utrecht University | |
dc.format.extent | 1042623 | |
dc.format.mimetype | application/pdf | |
dc.language.iso | en | |
dc.title | Methods for eigenvalue optimization with application to semidefinite optimization | |
dc.type.content | Master Thesis | |
dc.rights.accessrights | Open Access | |
dc.subject.keywords | eigenvalue optimization, semidefinite optimization, maxcut, theta, chebyshev polynome, subgradient, subdifferential, saspa, dpa, eigencurves | |
dc.subject.courseuu | Mathematical Sciences | |