Extremal Problems for GCDs and LCMs in Higher Dimensions

Abstract

We study extremal problems for tuples of integers chosen from sets Ai ⊂ [Xi,2Xi] for 1 i k, under large GCD and small LCM conditions. For the GCD problem, we extend the work of Green and Walker to higher dimensions. Specifically, for k 3, if (a1,…,ak) D for at least a proportion δ of the tuples in Πi=1k Ai, then Πi=1k |Ai| k, δ-k/(k-1)- Πi=1k XiDk. The proof is based on a minimal counterexample argument and a new high-dimensional measure concentration lemma. We also establish a large sieve-type inequality to obtain a complementary estimate for the GCD problem. For the LCM problem, we use a quite different method to show that, for all k 2, Πi=1k |Ai| k, δ-k/(k-1) Lk/(k-1)+ (Πi=1k Xi)1/(k-1), whenever lcm(a1,…,ak) L for at least a proportion δ of the k-tuples in Πi=1k Ai. Finally, we show that these bounds are essentially best possible up to -losses in the exponent.