SG-Hankel Pseudo-Differential Operators on Weighted Gelfand-Shilov Type Spaces and a Numerical Example
Abstract
We introduce a new class of SG pseudo-differential operators associated with the Hankel transform on a family of weighted Gelfand--Shilov type spaces of radial functions. First, we recall basic properties of the Hankel transform of order >-1/2 and define a convenient Gelfand--Shilov type space Wα,β which is invariant under the Hankel transform and stable under differentiation and multiplication by powers of the radial variable. Then we define the SG--Hankel symbol class Sm1,m2H and the corresponding pseudo-differential operator \[ (Tσ f)(x)=∫0∞ σ(x,λ)J(xλ) fH(λ)\,λ\,dλ. \] We prove that Tσ is continuous on Wα,β, and under additional decay assumptions on the symbol, we obtain compactness results between different weighted spaces. Minimal and maximal realisations of Tσ in L2((0,∞),x\, dx) are studied in detail, and a weak solvability result for the SG--Hankel pseudo-differential equation Tσ f=g is derived. Finally, we present a numerical example for a simple SG symbol and a Gaussian input, illustrating the spatial decay predicted by the theory.
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