Nontrivial effective lower bounds for the least common multiple of a q-arithmetic progression

Abstract

This paper is devoted to establish nontrivial effective lower bounds for the least common multiple of consecutive terms of a sequence (un)n ∈ N whose general term has the form un = r [n]q + u0, where q , r are positive integers and u0 is a non-negative integer such that gcd(u0 , r) = gcd(u1 , q) = 1. For such a sequence, we show that for all positive integer n, we have lcm\u1 , u2 , … , un\ ≥ c1 · c2n · qn24, where c1 and c2 are positive constants depending only on q , r and u0. This can be considered as a q-analog of the lower bounds already obtained by the author (in 2005) and by Hong and Feng (in 2006) for the arithmetic progressions.