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dc.contributor.advisorQuinn, J.
dc.contributor.authorTobiska, Josef
dc.date.accessioned2020-08-13T14:57:28Z
dc.date.available2020-08-13T14:57:28Z
dc.date.issued2003-01-01 0:00
dc.identifier.urihttps://scholar.oxy.edu/handle/20.500.12711/1015
dc.description.abstractCombinatorial mathematics is not frequently associated with quantum physics. However, work in one discipline can motivate investigations in the other. A recent conjecture regarding allowed multiplets in the composite fermion model led to a proof of the unimodality of restricted partitions with duplicate or consecutive parts. This in turn, allowed the original physics conjecture to be verified. The goal of my research is to use the KOH theorem to explore and identify other special sets of restricted integer partitions and use those sets to further generalize the conjecture mentioned above.
dc.description.sponsorshipNational Science Foundation - Award for the Integration of Research in Education Fellowship
dc.titleInteger Partitions and their Applicationto Quantum Physics
dc.typearticle
dc.abstract.formathtml
dc.description.departmentmath
dc.source.issueurc_student
dc.identifier.legacyhttps://scholar.oxy.edu/urc_student/533
dc.source.statuspublished


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