Bounded gaps between primes in number fields and function fields.

Lemke Oliver, Robert J.
Castillo, Abel.
Hall, Chris.
Pollack, Paul, 1980-
Thompson, Lola.
2015.

The Hardy-Littlewood prime k-tuples conjecture has long been thought to be completely unapproachable with current methods. While this sadly remains true, startling breakthroughs of Zhang, Maynard, and Tao have nevertheless made significant progress toward this problem. In this work, we extend the Maynard-Tao method to both number fields and the function field Fq(t) (c) 2015 American Mathematical S... read more

Subjects
Tufts University. Department of Mathematics.
Permanent URL
http://hdl.handle.net/10427/012442
Original publication
Castillo, Abel, Chris Hall, Robert J. Lemke Oliver, Paul Pollack, and Lola Thompson. "Bounded Gaps Between Primes in Number Fields and Function Fields." Proceedings of the American Mathematical Society 143, no. 7 (February 25, 2015): 2841-2856. doi:10.1090/s0002-9939-2015-12554-3.
ID: tufts:22354
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