The Sakai-Sugimoto soliton

TL;DR

This paper critically examines various approximations of the Sakai-Sugimoto soliton in holographic QCD, clarifies their validity, resolves contradictory results, and presents the first numerical solution supporting the analysis.

Contribution

It systematically analyzes the validity of common approximations of the Sakai-Sugimoto soliton and provides the first numerical computation confirming the theoretical findings.

Findings

Identified the regions where different approximations are valid.

Clarified the source of contradictory results in the literature.

Discovered a new large scale where nonlinear effects dominate.

Abstract

The Sakai-Sugimoto model is the preeminent example of a string theory description of holographic QCD, in which baryons correspond to topological solitons in the bulk. Here we investigate the validity of various approximations of the Sakai-Sugimoto soliton that are used widely to study the properties of holographic baryons. These approximations include the flat space self-dual instanton, a linear expansion in terms of eigenfunctions in the holographic direction and an asymptotic power series at large radius. These different approaches have produced contradictory results in the literature regarding properties of the baryon, such as relations for the electromagnetic form factors. Here we determine the regions of validity of these various approximations and show how to relate different approximations in contiguous regions of applicability. This analysis clarifies the source of the contradictory results in the literature and resolves some outstanding issues, including the use of the flat space self-dual instanton, the detailed properties of the asymptotic soliton tail, and the role of the UV cutoff introduced in previous investigations. A consequence of our analysis is the discovery of a new large scale, that grows logarithmically with the 't Hooft coupling, at which the soliton fields enter a nonlinear regime. Finally, we provide the first numerical computation of the Sakai-Sugimoto soliton and demonstrate that the numerical results support our analysis.