Commutative Geometry for Non-commutative D-branes by Tachyon Condensation

TL;DR

This paper demonstrates how tachyon condensation can be used to define the shape and position of non-abelian D-branes as commutative regions with gauge flux, resolving ambiguities in their geometric description.

Contribution

It introduces a method using tachyon condensation and coherent states to determine the geometry of non-abelian D-branes as commutative spaces with flux, including explicit examples like the Moyal plane and fuzzy sphere.

Findings

Non-abelian D0-branes can be described as commutative regions with gauge flux.

The shapes of noncommutative D2-branes become classical geometries like $\

,

Abstract

There is a difficulty in defining the positions of the D-branes when the scalar fields on them are non-abelian. We show that we can use tachyon condensation to determine the position or the shape of D0-branes uniquely as a commutative region in spacetime together with non-trivial gauge flux on it, even if the scalar fields are non-abelian. We use the idea of the so-called coherent state method developed in the field of matrix models in the context of the tachyon condensation. We investigate configurations of noncommutative D2-brane made out of D0-branes as examples. In particular, we examine a Moyal plane and a fuzzy sphere in detail, and show that whose shapes are commutative $\mathbb{R}^2$ and $S^2$, respectively, equipped with uniform magnetic flux on them. We study the physical meaning of this commutative geometry made out of matrices, and propose an interpretation in terms of K-homology.