Arithmetic duality in algebraic K-theory

• dc.contributor.advisor: Jacob Lurie.
• dc.contributor.author: Clausen, Dustin (Dustin Tate)
• dc.contributor.other: Massachusetts Institute of Technology. Department of Mathematics.
• dc.date.issued: 2013
• dc.identifier.uri: http://hdl.handle.net/1721.1/83692
• dc.description: Thesis (Ph. D.)--Massachusetts Institute of Technology, Department of Mathematics, 2013.
• dc.description: Cataloged from PDF version of thesis.
• dc.description: Includes bibliographical references (pages 37-38).
• dc.description.abstract: Let X be a regular arithmetic curve or point (meaning a regular separated scheme of finite type over Z which is connected and of Krull dimension </= 1). We define a compactly-supported variant Kc(X) of the algebraic K-theory spectrum K(X), and establish the basic functoriality of Kc. Briefly, K, behaves as if it were dual to K. Then we give this duality some grounding: for every prime t invertible on X, we define a natural l-adic pairing between Kc(X) and K(X). This pairing is of an explicit homotopy-theoretic nature, and reflects a simple relation between spheres, tori, and real vector spaces. Surprisingly, it has the following two properties: first (a consequence of work of Rezk), when one tries to compute it the e-adic logarithm inevitably appears; and second, it can be used to give a new description of the global Artin map, one which makes the Artin reciprocity law manifest.
• dc.description.statementofresponsibility: by Dustin Clausen.
• dc.format.extent: 38 pages
• dc.language.iso: eng
• dc.publisher: Massachusetts Institute of Technology
• dc.subject: Mathematics.
• dc.type: Thesis
• dc.description.degree: Ph.D.
• dc.contributor.department: Massachusetts Institute of Technology. Department of Mathematics
• dc.identifier.oclc: 864023117