Involutions in arithmetic geometry
Item
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Title
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Involutions in arithmetic geometry
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Identifier
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d_2009_2013:1ee670fe026f:11955
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identifier
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12635
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Creator
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Chen, Anbo,
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Contributor
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Bruce W. Jordan
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Date
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2013
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Language
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English
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Publisher
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City University of New York.
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Subject
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Mathematics | Theoretical mathematics | arithmetic geometry | integral representations | Involutions
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Abstract
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We first study the integral representation L of G = , where б is an involution. When L = H1(X, Z) for some algebraic curve X, we determine the structure L completely by the the intersection of J+ and J -, where J+/- are the subvarieties of the Jabocian J of X. Then, we study the structure of L = H1(X, Z) as the integral representation of Klein 4 group G = , where б and tau are two commuting involutions. Computations are also included in our work.
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Type
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dissertation
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Source
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2009_2013.csv
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degree
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Ph.D.
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Program
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Mathematics
