Long arithmetic progressions of primes: some old, some new

Paul Pritchard

Type: Article

Publication Date: 1985-01-01

Citations: 11

DOI: https://doi.org/10.1090/s0025-5718-1985-0790659-1

Abstract

The results are reported of an extensive search with a computer for "long" arithmetic progressions of primes. Such progressions with minimum last term are now known for all lengths up to and including nineteen.

Locations

Mathematics of Computation - View - PDF
eCommons (Cornell University) - View - PDF

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Action	Title	Year	Authors
+	On the Construction of Prime Desert n-Tuplets	1992	Marusarz Marta Derek
+ PDF Chat	Twenty-Two Primes in Arithmetic Progression	1995	Paul Pritchard Andrew Moran Anthony Thyssen
+	How are the Prime Numbers Distributed?	1989	Paulo Ribenboim
+	How Are the Prime Numbers Distributed?	1991	Paulo Ribenboim
+	How Are the Prime Numbers Distributed?	1996	Paulo Ribenboim
+	Zahlentheorie	1997	Victor Klee Stan Wagon
+	The Little Book of Bigger Primes	2004	Paulo Ribenboim
+	Prime Numbers	1994	Richard K. Guy
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+	Three Primes and an Almost-Prime in Arithmetic Progression	1981	I. Heath-Brown
+	A case study of number-theoretic computation: searching for primes in arithmetic progression	1983	Paul Pritchard
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