On finite soluble groups with almost fixed-point-free automorphisms of non-coprime order

Abstract

It is proved that if a finite p-soluble group G admits an automorphism of order pn having at most m fixed points on every -invariant elementary abelian p'-section of G, then the p-length of G is bounded above in terms of pn and m; if in addition the group G is soluble, then the Fitting height of G is bounded above in terms of pn and m. It is also proved that if a finite soluble group G admits an automorphism of order paqb for some primes p,q, then the Fitting height of G is bounded above in terms of | | and |CG( )|.