Filtered power automorphism

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Definition

Suppose G is a nilpotent group. Consider a central series of G of the form:

G=H1H2H3Hn=1

A filtered power automorphism of G corresponding to a rational number r is an automorphism σ of G such that the following hold:

  • σ(Hi)=Hi for each i.
  • Each of the quotient groups Hi/Hi+1 is powered over all primes dividing the numerator or denominator of r.
  • The induced automorphism by σ on the quotient group Hi/Hi+1 is the powering map by ri.