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dc.contributor.authorZatloukal, Kevin C.en_US
dc.date.accessioned2017-06-08T09:39:33Z
dc.date.available2017-06-08T09:39:33Z
dc.date.issued2016en_US
dc.identifier.otherHPU4160741en_US
dc.identifier.urihttps://lib.hpu.edu.vn/handle/123456789/24895en_US
dc.description.abstractShor's groundbreaking algorithms for integer factoring and discrete logarithm [58], along with their later generalizations 116, 35, 49, 18], demonstrated a unique ability of quantum computers to solve problems defined on abelian groups. In this thesis, we study ways in which that ability can be leveraged in order to solve problems on more complex structures such as non-abelian groups and hypergroups. This leads to new quantum algorithms for the hidden subgroup problem on nilpotent groups whose order is a product of large primes, the hidden subhypergroup problem on both strongly integral hypergroups and ultragroups, testing equivalence of group extensions, and computing the component parts of the cohomology groups of both group extensions and a generalization of simplicial complexes, amongst other problems. For each of those listed, we also show that no classical algorithm can achieve similar efficiency under standard cryptographic assumptions.en_US
dc.format.extent168 p.en_US
dc.format.mimetypeapplication/pdfen_US
dc.language.isoenen_US
dc.publisherMIT International Center for Air Transportation (ICAT)en_US
dc.subjectElectrical Engineeringen_US
dc.subjectComputer Scienceen_US
dc.subjectTechnologyen_US
dc.subjectAbelian algebraic structuresen_US
dc.subjectQuantum computationen_US
dc.titleApplications of abelian algebraic structures in quantum computationen_US
dc.typeThesisen_US
dc.size9.5Mben_US
dc.departmentTechnologyen_US


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