Triple Root Systems, Quasi-determinantal Quivers and Linear Free Divisors

Abstract

We start by constructing a new root system for rational triple singularities and determine the number of roots for each rational triple singularity. Then we show that, for each root, we obtain a linear free divisor. So we obtain a new family of linear free divisors. This gives the converse part of an existing theorem which says, by using the quiver representation, that linear free divisors come from a tree. We prove that our construction is independent of the orientation on the rational triple trees. Furthermore, we deduce that linear free divisors defined by rational triple quivers satisfy the logarithmic comparison theorem. In last section, we generalize the results of these results to rational quasi-determinantal singularities.