Non-harmonic cones are Heisenberg uniqueness pairs for the Fourier transform on Rn
Abstract
In this article, we prove that a cone is a Heisenberg uniqueness pair corresponding to sphere as long as the cone does not completely recline on the level surface of any homogeneous harmonic polynomial on Rn. We derive that (S2, paraboloid) and (S2, geodesic of Sr(o)) are Heisenberg uniqueness pairs for a class of certain symmetric finite Borel measures in R3. Further, we correlate the problem of Heisenberg uniqueness pairs to the sets of injectivity for the spherical mean operator.
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