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Construction and Systematical Symmetric Studies of a Series of Supramolecular Clusters with Binary or Ternary Ammonium Triphenylacetates
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On Thompson's conjecture for alternating groups A p+3.

Shitian Liu1, Yong Yang1

  • 1School of Science, Sichuan University of Science and Engineering, Zigong, Sichuan 643000, China.

Thescientificworldjournal
|August 23, 2014
PubMed
Summary
This summary is machine-generated.

Finite groups with trivial centers are characterized by the set of nonidentity orders of conjugacy classes. If N(G) equals N(A p+3) and p+2 is composite, G is isomorphic to A p+3.

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Area of Science:

  • Group Theory
  • Abstract Algebra
  • Computational Group Theory

Background:

  • The study builds upon previous work characterizing alternating groups (A_n) using properties of their prime graphs and conjugacy class element orders.
  • The prime graph GK(G) connects primes dividing the group order |G| if an element of order pq exists.
  • s(G) denotes the number of connected components in GK(G).

Purpose of the Study:

  • To extend characterization theorems for finite groups.
  • To investigate the relationship between the set of nonidentity orders of conjugacy classes (N(G)) and group isomorphism.
  • Specifically, to determine if a finite group G with a trivial center is isomorphic to A_{p+3} given N(G) = N(A_{p+3}) and a composite p+2.

Main Methods:

  • Utilizing concepts from group theory, including prime divisors of group orders, element orders, and conjugacy classes.
  • Analyzing the structure of the prime graph GK(G) and its connected components (s(G)).
  • Applying group isomorphism theorems and properties of alternating groups (A_n).

Main Results:

  • The research proves that a finite group G with a trivial center is isomorphic to the alternating group A_{p+3} if its set of nonidentity conjugacy class element orders, N(G), is identical to that of A_{p+3}, provided that p+2 is a composite number.
  • This extends existing characterization results for alternating groups.

Conclusions:

  • The set of nonidentity orders of conjugacy classes, N(G), along with the trivial center condition and specific properties of p, can uniquely identify certain finite groups.
  • The findings contribute to the understanding of group structure and classification through number-theoretic properties of group elements.