Planar field theories with space-dependent noncommutativity

TL;DR

This paper develops a framework for planar noncommutative field theories with space-dependent noncommutativity, revealing boundary effects where the noncommutativity parameter vanishes along a line.

Contribution

It introduces a novel operatorial approach to noncommutative field theories with variable noncommutativity and analyzes boundary phenomena arising from space-dependent noncommutativity.

Findings

Boundary terms localized along the line where noncommutativity vanishes

A noncommutative product compatible with a specific operator ordering

Scalar field actions that include boundary contributions

Abstract

We study planar noncommutative theories such that the spatial coordinates ${\hat x}_1$, ${\hat x}_2$ verify a commutation relation of the form: $[{\hat x}_1, {\hat x}_2] = i \theta ({\hat x}_1,{\hat x}_2)$. Starting from the operatorial representation for dynamical variables in the algebra generated by ${\hat x}_1$ and ${\hat x}_2$, we introduce a noncommutative product of functions corresponding to a specific operator-ordering prescription. We define derivatives and traces, and use them to construct scalar-field actions. The resulting expressions allow one to consider situations where an expansion in powers of $\theta$ and its derivatives is not necessarily valid. In particular, we study in detail the case when $\theta$ vanishes along a linear region. We show that, in that case, a scalar field action generates a boundary term, localized around the line where $\theta$ vanishes.