Order has only two prime factors implies prime divisor with larger class two subgroups is core-nontrivial
Suppose and are two distinct primes, and is a group of order for nonnegative integers . Suppose denotes the maximum of the orders of -subgroups of of nilpotence class two. Then, if , is a core-nontrivial prime divisor of : has a normal -subgroup.
- On Burnside's other p^aq^b-theorem by George Glauberman, Pacific Journal of Mathematics, Volume 56, Page 469 - 476(Year 1975): This paper proves that Order has only two prime factors implies prime divisor with larger class two subgroups is core-nontrivial.Project Euclid pageMore info