Solvability of invariant systems of differential equations on H2 and beyond
Abstract
We show how the Fourier transform for distributional sections of vector bundles over symmetric spaces of non-compact type G/K can be used for questions of solvability of systems of invariant differential equations in analogy to H\"ormander's proof of the Ehrenpreis-Malgrange theorem. We get complete solvability for the hyperbolic plane H2 and partial results for products H2 × ·s × H2 and the hyperbolic 3-space H3.
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