D0-brane realizations of the resolution of a reduced singular curve

Abstract

Based on examples from superstring/D-brane theory since the work of Douglas and Moore on resolution of singularities of a superstring target-space Y via a D-brane probe, the richness and the complexity of the stack of punctual D0-branes on a variety, and as a guiding question, we lay down a conjecture that any resolution Y→ Y of a variety Y over C can be factored through an embedding of Y into the stack M0A zf\;pr (Y) of punctual D0-branes of rank r on Y for r r0 in N, where r0 depends on the germ of singularities of Y. We prove that this conjecture holds for the resolution : C→ C of a reduced singular curve C over C. In string-theoretical language, this says that the resolution C of a singular curve C always arises from an appropriate D0-brane aggregation on C and that the rank of the Chan-Paton module of the D0-branes involved can be chosen to be arbitrarily large.