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Given a finite group G, we denote by $$\psi (G)$$ψ(G) the sum of the element orders in G. In this article, we prove that if t is the number of… Click to show full abstract
Given a finite group G, we denote by $$\psi (G)$$ψ(G) the sum of the element orders in G. In this article, we prove that if t is the number of nonidentity conjugacy classes in G, then $$\psi (G)=1+t|G|$$ψ(G)=1+t|G| if and only if G is either a group of prime order or a nonabelian group of the square-free order with two prime divisors. Also we find a unique group with the second maximum sum of the element orders among all finite groups of the same square-free order.
Keywords:
sum element;
element orders;
group;
groups square;
orders groups;
square free
Journal Title: Bulletin of the Malaysian Mathematical Sciences Society
Year Published: 2017
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Journal Title: Bulletin of the Malaysian Mathematical Sciences Society
Year Published: 2017
Link to full text (if available)
Share on Social Media: Sign Up to like & get
recommendations!