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dc.contributor.authorSteel, Jacob
dc.date.accessioned2011-07-12T13:24:24Z
dc.date.available2011-07-12T13:24:24Z
dc.date.issued2010
dc.identifier.urihttp://qmro.qmul.ac.uk/xmlui/handle/123456789/1292
dc.descriptionPhDen_US
dc.description.abstractMajorisation is a partial ordering that can be applied to the set of probability measures on the unit interval I = [0, 1). Its defining property is that one measure μ majorises another measure , written μ , if R I fdμ R I fd for every convex real-valued function f : I ! R. This means that studying the majorisation of MT , the set of measures invariant under a transformation T : I ! I, can give us insight into finding the maximising and minimising T-invariant measures for convex and concave f. In this thesis I look at the majorisation ordering of MT for four categories of transformations T: concave unimodal maps, the doubling map T : x 7! 2x (mod 1), the family of shifted doubling maps T : x 7! 2x + (mod 1), and the family of orientation-reversing weakly-expanding maps.en_US
dc.language.isoenen_US
dc.publisherQueen Mary University of London
dc.subjectPhysicsen_US
dc.titleMajorisation ordering of measures invariant under transformations of the intervalen_US
dc.typeThesisen_US
dc.rights.holderThe copyright of this thesis rests with the author and no quotation from it or information derived from it may be published without the prior written consent of the author


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    Theses Awarded by Queen Mary University of London

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