The Pseudo-Analytic Mass of a Beltrami-Vekua Equation

Abstract

Every smooth first-order real planar elliptic system admits a universal complex form w z - μ wz + A w + B w = F, which we call the Beltrami-Vekua equation: the data (μ, A, B, F) are produced from the original system by algebraic operations and differentiations, with no auxiliary PDE. On this space we study the joint action of multiplicative gauges w φ w and orientation-preserving diffeomorphisms. Our main result is that the 2-form = |B|2 / (1 - |μ|2) \, dx \, dy is gauge-invariant and pulls back covariantly under diffeomorphisms; its form is forced, with |B|2 the unique B-quadratic combination invariant under B Bφ/φ and 1 - |μ|2 the conformal distortion factor from the diffeomorphism law for μ. The total mass M(D) = ∫ , the pseudo-analytic mass, vanishes precisely on the analytic class B 0 and separates a continuous family of pairwise inequivalent pseudo-analytic equations on the disk. As a by-product, Vekua's two-stage reduction - uniformization then gauge elimination - requires only one variable-coefficient PDE solve: the Beltrami diffeomorphism supplies the integrating factor for a flat ∂-equation.