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ANTS
1998
Springer
1998
Springer
Dense Admissible Sets
Call a set of integers {b1, b2, . . . , bk} admissible if for any prime p, at least one congruence class modulo p does not contain any of the bi. Let (x) be the size of the largest admissible set in [1, x]. The Prime k-tuples Conjecture states that any for any admissible set, there are infinitely many n such that n+b1, n+b2, . . . n+bk are simultaneously prime. In 1974, Hensley and Richards [3] showed that (x) > (x) for x sufficiently large, which shows that the Prime k-tuples Conjecture is inconsistent with a conjecture of Hardy and Littlewood that for all integers x, y 2, (x + y) (x) + (y). In this paper we examine the behavior of (x), in particular, the point at which (x) first exceeds (x), and its asymptotic growth.
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| Added | 05 Aug 2010 |
| Updated | 05 Aug 2010 |
| Type | Conference |
| Year | 1998 |
| Where | ANTS |
| Authors | Daniel M. Gordon, Eugene R. Rodemich |
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