Lehmer sequence approach to the divisibility of class numbers of imaginary quadratic fields

Abstract

Let k≥ 3 and n≥ 3 be odd integers, and let m≥ 0 be any integer. For a prime number , we prove that the class number of the imaginary quadratic field Q(2m-2kn) is either divisible by n or by a specific divisor of n. Applying this result, we construct an infinite family of certain tuples of imaginary quadratic fields of the form (Q(d), Q(d+1), Q(4d+1), Q(2d+4), Q(2d+16), ·s, Q(2d+4t) ) with d∈ Z and 1≤ 4t≤ 2|d| whose class numbers are all divisible by n. Our proofs use some deep results about primitive divisors of Lehmer sequences.