Asymptotic Improvements of Lower Bounds for the Least Common Multiples of Arithmetic Progressions
Abstract
For relatively prime positive integers u0 and r, we consider the least common multiple Ln:=lcm(u0,u1,…, un) of the finite arithmetic progression \uk:=u0+kr\k=0n. We derive new lower bounds on Ln which improve upon those obtained previously when either u0 or n is large. When r is prime, our best bound is sharp up to a factor of n+1 for u0 properly chosen, and is also nearly sharp as n∞.
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