"Geometric Configurations in the Ring of Integers Modulo P^ℓ" by David Covert

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Geometric Configurations in the Ring of Integers Modulo P^ℓ

Indiana University Mathematics Journal (2011)

David Covert, University of Missouri-St. Louis
Alex Iosevichc
Jonathan Pakianathan

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Abstract

We study variants of the Erd˝os distance problem and the dot products problem in the setting of the integers modulo q, where q = p^ℓ is a power of an odd prime.

Disciplines

Computer Sciences and
Mathematics

Publication Date

May 27, 2011

DOI

10.1512/iumj.2012.61.4751

Citation Information

David Covert, Alex Iosevichc and Jonathan Pakianathan. "Geometric Configurations in the Ring of Integers Modulo P^ℓ" Indiana University Mathematics Journal Vol. 61 Iss. 5 (2011) p. 1949 - 1969
Available at: http://works.bepress.com/david-covert/9/