On the number of subgroups of the group Zm1 × Zm2 with m1m2≤ x such that m1m2 is a k-th power
Abstract
Let Zm be the additive group of residue classes modulo m and s(m1,m2) denote the number of subgroups of the group Zm1× Zm2, where m1 and m2 are arbitrary positive integers. We consider sums of type Σm1m2≤ x \\ m1m2∈ Nks(m1,m2), where Nk is the set of k-th power of natural numbers. In particular, we deduce asymptotic formulas with k=2 and k=3.
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