Domain walls between gauge theories

TL;DR

This paper constructs and analyzes noncommutative domain walls between different gauge theories on fuzzy cylinders, revealing their properties, stability, and potential M-theory interpretations.

Contribution

It introduces explicit solutions for noncommutative domain walls on fuzzy cylinders and explores their physical properties and implications.

Findings

Domain walls separate vacua with different gauge theories.

Walls support chiral fermion zero modes.

The non-BPS wall-antiwall solution is unstable.

Abstract

Noncommutative U(N) gauge theories at different N may be often thought of as different sectors of a single theory: the U(1) theory possesses a sequence of vacua labeled by an integer parameter N, and the theory in the vicinity of the N-th vacuum coincides with the U(N) noncommutative gauge theory. We construct noncommutative domain walls on fuzzy cylinder, separating vacua with different gauge theories. These domain walls are solutions of BPS equations in gauge theory with an extra term stabilizing the radius of the cylinder. We study properties of the domain walls using adjoint scalar and fundamental fermion fields as probes. We show that the regions on different sides of the wall are not disjoint even in the low energy regime -- there are modes penetrating from one region to the other. We find that the wall supports a chiral fermion zero mode. Also, we study non-BPS solution representing a wall and an antiwall, and show that this solution is unstable. We suggest that the domain walls emerge as solutions of matrix model in large class of pp-wave backgrounds with inhomogeneous field strength. In the M-theory language, the domain walls have an interpretation of a stack of branes of fingerstall shape inserted into a stack of cylindrical branes.