Right inverses for partial differential operators on spaces of Whitney functions
Abstract
For v∈ Rn let K be a compact set in Rn containing a suitable smooth surface and such that the intersection tv+x:t∈ R K is a closed interval or a single point for all x∈ K. We prove that every linear first order differential operator with constant coefficients in direction v on space of Whitney functions E(K) admits a continuous linear right inverse.
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