On reflection maps from the n-space to the n+1-space

Abstract

In this work we consider some problems about a reflected graph map germ f from (Cn,0) to (Cn+1,0). A reflected graph map is a particular case of a reflection map, which is defined using an embedding of Cn in Cp and then applying the action of a reflection group G on Cp. In this work, we present a description of the presentation matrix of f* On as an On+1-module via f in terms of the action of the associated reflection group G. We also give a description for a defining equation of the image of f in terms of the action of G. Finally, we provide an upper (and also a lower) bound for the multiplicity of the image of f and some applications.