The Pseudo-Analytic Charge
Abstract
The framed Beltrami--Vekua equation Φ(w z - μwz) + Ψ(wz - μw z) + aw + b w = f, with |μ|<1 and |Φ|>|Ψ|, carries a numerator field N = Φb - Ψa - WL(Φ,Ψ) whose weighted modulus integrates to the pseudo-analytic mass. This paper extracts the integer carried by the same field. When the zero set of N is compactly contained in a bounded simply connected domain, the winding number of N along any enclosing curve -- the pseudo-analytic charge n ∈ Z -- is invariant under every recombination w = φw' + ψ w' of the unknown, every scaling of the equation, and every orientation-preserving C1 change of variables: recombinations multiply N by the positive factor |φ|2 - |ψ|2, so their invariance is exact, while on multiply connected domains the other two actions fix the component charges only in Z/2Z and the total charge exactly. The charge is a Brouwer degree: it localizes at the zeros of N, vortices which no action of the class creates or destroys; an isolated vortex persists under perturbation of the data precisely when its local charge is non-zero. It involves the Beltrami coefficient only through the L-Wronskian of the frame, and is μ-independent wherever W∂(Φ,Ψ) 0 -- in particular at the trivial frame, where N = B and the charge is the gauge-invariant winding of the coefficient of the Beltrami--Vekua equation. Mass and charge are independent: every pair in (0,∞)×Z is realized.
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