A Metric-Deformed q-Gauge Dirac Equation

Abstract

We construct a family of metric-deformed gauge theories based on a recently introduced q-Dirac operator Dq = γμ|gμμ|∂μ, which arises from a deformed D'Alembertian q = |g00|∂t2 - Σi |gii|∂i2. The deformation parameter q is related to the metric components via qμ= |gμμ|. By promoting gμμ(x) to spacetime-dependent background fields, we define a deformed covariant derivative Dμ(q) = ∂μ+ ieAμ(x)/|gμμ(x)| (no sum over μ). The corresponding field strength Fμν(q) = [Dμ(q), Dν(q)] acquires new terms proportional to ∂μ(1/|gνν|), which vanish for constant metrics. We write down gauge-invariant actions for deformed Yang-Mills theory and for fermions minimally coupled to Dμ(q). This work provides a mathematical foundation for q-deformed gauge theories from a metric perspective.