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dc.contributor.authorHeuer, Dylan
dc.description.abstractMotivated by the study of chained permutations and alternating sign matrices, we investigate partial permutations and alternating sign matrices. We give a length generating function for partial permutations and show bijections relating certain subsets to decorated permutations and set partitions. We prove bijections among partial alternating sign matrices and several other combinatorial objects as well as results related to their dynamics, analogous to those in the usual alternating sign matrix setting. We also study families of polytopes which are the convex hulls of these matrices. We determine inequality descriptions, facet enumerations, and face lattice descriptions. Finally, we study partial permutohedra which arise naturally as projections of these polytopes, revealing connections to graph associahedra.en_US
dc.publisherNorth Dakota State Universityen_US
dc.rightsNDSU policy 190.6.2
dc.titleOn Partial Permutations and Alternating Sign Matrices: Bijections and Polytopesen_US
dc.typeDissertationen_US
dc.typeVideoen_US
dc.date.accessioned2022-06-07T19:36:52Z
dc.date.available2022-06-07T19:36:52Z
dc.date.issued2021
dc.identifier.urihttps://hdl.handle.net/10365/32708
dc.subjectalternating sign matrixen_US
dc.subjectbijectionsen_US
dc.subjectpartial permutationen_US
dc.subjectpermutohedronen_US
dc.subjectpolytopeen_US
dc.rights.urihttps://www.ndsu.edu/fileadmin/policy/190.pdfen_US
ndsu.degreeDoctor of Philosophy (PhD)en_US
ndsu.collegeScience and Mathematicsen_US
ndsu.departmentMathematicsen_US
ndsu.advisorStriker, Jessica


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