Prime injections and quasipolarities

Abstract

Let p be a prime number. Consider the injection \[ :Z/nZ/pnZ:x px, \] and the elements eu.v:=(u,v)∈ Z/nZ Z/nZ× and ew.r:=(w,r)∈ Zp n Zp n×. Suppose eu.v∈ Z/nZ Z/nZ× is seen as an automorphism of Z/nZ by eu.v(x)=vx+u; then eu.v is a quasipolarity if it is an involution without fixed points. In this brief note give an explicit formula for the number of quasipolarites of Z/nZ in terms of the prime decomposition of n, and we prove sufficient conditions such that (ew.r) = (eu.v), where ew.r and eu.v are quasipolarities.