F2 - properties

order of an element in a direct product

  • the order of an element in a direct product of a finite number of finite groups is the least common multiple of the orders of the components of the elements
|(g1,g2,,gn)|=lcm(|g1|,|g2|,,|gn|)

criterion for GH to be cyclic

  • let G and H be finite cyclic subgroups, then GH is cyclic if and only if |G| and |H| are relatively prime

criterion for i=1nGi to be cyclic

  • i=1nGi for finite n and cyclic Gi's is cyclic if and only if Gi and Gj are relatively prime when ij

criterion for Zn1n2nkZn1Zn2Znk

  • let m=n1n2nk , then Zm is isomorphic to i=1kZni if and only if ni and nj are relatively prime when ij