Exact bounds for the sum of the inverse-power of element orders in non-cyclic finite groups

Abstract

Given a finite group G of order n. Denote the sum of the inverse-power of element orders in G by m(G). Let Zn be the cyclic group of order n. Suppose G is a non-cyclic group of order n then we show that m(G)≥ 54m(Zn). Our result improves the inequality m(G)>m(Zn) obtained by Baniasad Azad, M., and Khorsravi B. Moreover, this bound is best as for n=4l, l odd, there exists a group G of order n satisfying m(G)=54m(Zn). Moreover, we will establish that 1q-1m(G)< m(Zn)≤ 45m(G), where G is a non-cyclic group of odd order.

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