Differential invariants of
the 2D conformal Lie algebra action

dc.contributor.advisor	Kruglikov, Boris
dc.contributor.author	Høyem, Marte Rørvik
dc.date.accessioned	2008-04-10T12:41:05Z
dc.date.available	2008-04-10T12:41:05Z
dc.date.issued	2008-02-15
dc.description.abstract	In this thises we consider the Lie algebra that corresponds to the Lie pseudogroup of all conformal transformations on the plane. This conformal Lie algebra is canonically represented as a Lie algebra of vector fields on R^2. We will find all possible representations of vector fields in R^3=J^0R^2 which projects to the canonical representation and find the algebra of scalar differential invariants for each these representations of the conformal Lie algebra in J^0R^2.	en
dc.format.extent	398269 bytes
dc.format.extent	2072 bytes
dc.format.mimetype	application/pdf
dc.format.mimetype	text/plain
dc.identifier.uri	https://hdl.handle.net/10037/1394
dc.identifier.urn	URN:NBN:no-uit_munin_1176
dc.language.iso	eng	en
dc.publisher	Universitetet i Tromsø	en
dc.publisher	University of Tromsø	en
dc.rights.accessRights	openAccess
dc.rights.holder	Copyright 2008 The Author(s)
dc.subject.courseID	MAT-3900	nor
dc.subject	VDP::Mathematics and natural science: 400::Mathematics: 410::Topology/geometry: 415	en
dc.title	Differential invariants of the 2D conformal Lie algebra action	en
dc.type	Master thesis	en
dc.type	Mastergradsoppgave	en