Measures Determined by the Restriction of Convolution Powers to the Proper Concave Cone

Abstract

Let μ and be two non-degenerate finite signed Borel measures defined on a proper convex cone of Rn. We prove that if all convolution powers of μ and are appropriately equal (and non-zero) on a proper concave cone of Rn, the measures are equal. A similar but more general result for measures defined on R can be found in [2]. We also provide an example of two-dimensional measures, which indicates that equality of measures and their appropriate convolution powers on a half-plane is not enough for equality of measures.