On the maximal length of two sequences of integers in arithmetic progressions with the same prime divisors

R. Balasubramanian, M. Langevin, T. N. Shorey, Michel Waldschmidt

Type: Article

Publication Date: 1996-12-01

Citations: 10

DOI: https://doi.org/10.1007/bf01308722

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Locations

Monatshefte für Mathematik - View

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Works That Cite This (8)

Action	Title	Year	Authors
+	Open Diophantine Problems	2004	Michel Waldschmidt
+	Arithmetic Properties of Blocks of Consecutive Integers	2016	T. N. Shorey R. Tijdeman
+	Points on Curves	2020	Levent Alpöge
+ PDF Chat	Some extensions and refinements of a theorem of Sylvester	2002	N. Saradha T. N. Shorey R. Tijdeman
+	The Woods–Erdös conjecture for polynomial rings	2001	Maxim Vsemirnov
+ PDF Chat	On the difference of values of the kernel function at consecutiveintegers	2003	Jean-Marie De Koninck Florian Luca
+	Open Diophantine Problems	2003	Michel Waldschmidt
+ PDF Chat	Explicit abc-conjecture and its applications	2019	Kwok Chi Chim Saranya G. Nair T. N. Shorey

Works Cited by This (3)

Action	Title	Year	Authors
+	On the greatest prime factor of an arithmetical progression	2012	T. N. Shorey R. Tijdeman
+	On the maximal length of two sequences of consecutive integers with the same prime divisors	1989	R. Balasubramanian T. N. Shorey Michel Waldschmidt
+	Explicit upper bounds for the solutions of some diophantine equations	1980	Kálmán Győry