Normal form for maps with nilpotent linear part

Abstract: The normal form for an n-dimensional map with irreducible nilpotent linear part is determined using sl 2 -representation theory. We sketch by example how the reducible case can also be treated in an algorithmic manner. The construction (and proof) of the sl 2 -triple from the nilpotent linear part is more complicated than one would hope for, but once the abstract sl 2 theory is in place, both the description of the normal form and the computational splitting to compute the generator of the coordinate transform… Show more