Quiver D-modules and the Riemann-Hilbert correspondence

Abstract

In this paper, we show that every regular singular D-module in Cn whose singular locus is a normal crossing is isomorphic to a quiver D-module - a D-module whose definition is based on certain representations of the hypercube quiver. To be more precise we give an equivalence of the respective categories. Our definition of quiver D-modules is based on the one of Khoroshkin and Varchenko. To prove the equivalence, we use an equivalence by Galligo, Granger and Maisonobe for regular singular D-modules whose singular locus is a normal crossing which involves the classical Riemann-Hilbert correspondence.