0,1

Zassenhaus-groups are groups in which all Sylow subgroups are cyclic . n belongs to this sequence iff n is divisible by two distinct primes p and q, such that p divides q-1. This sequence contains sequence A064899 and it is a subsequence of sequence A056868.

Cf. A064899, A056868.

Sequence in context: A135711 A161543 A056868 this_sequence A060702 A054741 A098902

Adjacent sequences: A069206 A069207 A069208 this_sequence A069210 A069211 A069212

nonn

Sharon Sela (sharonsela(AT)hotmail.com), Apr 14 2002