A solution to the Pompeiu problem

Abstract

Let f ∈ Lloc1 (n) S, where S is the Schwartz class of distributions, and ∫σ (D) f(x) dx = 0 ∀ σ ∈ G, (*) where D⊂ n is a bounded domain, the closure D of which is diffeomorphic to a closed ball, and S is its boundary. Then the comp is connected and path connected. By G the group of all rigid motions of n is denoted. This group consists of all translations and rotations. A proof of the following theorem is given. Theorem 1. Assume that n=2, f 0, and (*) holds. Then D is a ball. Corollary. If the problem (∇2+k2)u=0 in D, uN|S=0, u|S=const≠ 0 has a solution, then D is a ball. Here N is the outer unit normal to S$.