The global asymptotic structure of period mappings
Publication
, Journal Article
Green, M; Griffiths, P; Robles, C
October 13, 2020
This work is part of a project to construct completions of period mappings. A proper topological SBB-esque completion is constructed. The fibres of are projective varieties, and the image is a union of quasi-projective varieties; one wants to endow the topological completion with a compatible algebraic structure. This raises questions about: (i) the global geometry of the fibres; and (ii) the existence of period matrix representations on neighborhoods of such fibres over which the restricted extension is still proper. The purpose of this paper is to investigate these questions.
Duke Scholars
Publication Date
October 13, 2020
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Green, M., Griffiths, P., & Robles, C. (2020). The global asymptotic structure of period mappings.
Green, Mark, Phillip Griffiths, and Colleen Robles. “The global asymptotic structure of period mappings,” October 13, 2020.
Green M, Griffiths P, Robles C. The global asymptotic structure of period mappings. 2020 Oct 13;
Green, Mark, et al. The global asymptotic structure of period mappings. Oct. 2020.
Green M, Griffiths P, Robles C. The global asymptotic structure of period mappings. 2020 Oct 13;
Publication Date
October 13, 2020