Nontrivial effective lower bounds for the least common multiple of some quadratic sequences

Abstract

This paper is devoted to studying the numbers Lc,m,n := lcm\m2+c ,(m+1)2+c , … , n2+c\, where c,m,n are positive integers such that m ≤ n. Precisely, we prove that Lc,m,n is a multiple of the rational number \[Πk=mn(k2+c)c · (n-m)!Πk=1n-m(k2+4c) ,\] and we derive (as consequences) some nontrivial lower bounds for Lc,m,n. We prove for example that if n- 12 n2/3 ≤ m ≤ n, then we have Lc,m,n ≥ λ(c) · n e3 (n - m), where λ(c) := e- 2 π23 c - 512(2 π)3/2 c. Further, it must be noted that our approach (focusing on commutative algebra) is new and different from those using previously by Farhi, Oon and Hong.