Tiling the line with translates of one tile

A region T is a closed subset of the real line of positive finite Lebesgue measure which has a boundary of measure zero. Call a region T a tile if R can be tiled by measure-disjoint translates of T. For a bounded tile all tilings of R with its translates are periodic, and there are finitely many translation equivalence classes of such tilings. The main result of the paper is that for any tiling of R by a bounded tile, any two tiles in the tiling differ by a rational multiple of the minimal period of the tiling. From it we deduce a structure theorem characterizing such tiles in terms of complementing sets for finite cyclic groups.