Arithmetic Uniformization of Rigid Elliptic Structures: From Rigid to Standard Vekua without the Beltrami Equation
Abstract
For the rigid subclass of variable elliptic structures -- characterized equivalently by the inviscid Burgers law λx+λλy=0 or the self-dilatation μ z=μμz -- we show that the auxiliary Beltrami equation in the classical Vekua pipeline is unnecessary. The canonical coordinate =y-λ x, computed by arithmetic from the spectral parameter λ, reduces every rigid variable-algebra Vekua equation to a standard Vekua equation in on any open set where the characteristic Jacobian =x+λy does not vanish, with global reduction on domains where is injective. No PDE is solved at any stage.
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