Projective superflows. III. Finite subgroups of U(2)

Abstract

Let X∈Rn or Cn. For φ:Rnn (respectively, φ:Cnn) and t∈R (respectively, C), we put φt=t-1φ(Xt). A projective flow is a solution to the projective translation equation φt+s=φtφs, t,s∈R or C. The projective superflow is a projective flow with a rational vector field which, among projective flows with a given symmetry, is, up to a homothety, unique and optimal. In the first and the second part of this work we classified real 2 and 3-dimensional supeflows over R. In this third part we classify all 2-dimensional complex superflows; that is, whose group of symmetries are finite subgroups of U(2). This includes both irreducible and reducible superflows.