d-plane transform: unique and non-unique continuation

Abstract

The d-plane transform maps functions to their integrals over d-planes in Rn. We study the following question: if a function vanishes in a bounded open set, and its d-plane transform vanishes on all d-planes intersecting the same set, does the function vanish identically? For d an even integer, we show by producing an explicit counterexample, that neither the d-plane transform, nor its normal operator has this property. On the other hand, an even stronger property holds when d is odd, where the normal operator vanishing to infinite order at a point, along with the function vanishing on an open set containing that point, is sufficient to conclude that the function vanishes identically.

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