The least common multiple of consecutive quadratic progression terms

Abstract

Let k be an arbitrary given positive integer and let f(x)∈ Z[x] be a quadratic polynomial with a and D as its leading coefficient and discriminant, respectively. Associated to the least common multiple lcm0 i k\f(n+i)\ of any k+1 consecutive terms in the quadratic progression \f(n)\n∈ N*, we define the function gk, f(n):=(Πi=0k|f(n+i)|)/ lcm0 i k\f(n+i)\ for all integers n∈ N* Zk, f, where Zk,f:=i=0k\n∈ N*: f(n+i)=0\. In this paper, we first show that gk,f is eventually periodic if and only if D a2i2 for all integers i with 1 i k. Consequently, we develop a detailed p-adic analysis of gk, f and determine its smallest period. Finally, we obtain asymptotic formulas of lcm0 i k\f(n+i)\ for all quadratic polynomials f as n goes to infinity.