| Abstract: | In contrast to the situation with self‐affine tiles, the representation of self‐affine multi‐tiles may not be unique (for a fixed dilation matrix). Let  be an integral self‐affine multi‐tile associated with an  integral, expansive matrix B and let K tile  by translates of  . In this work, we propose a stepwise method to decompose K into measure disjoint pieces  satisfying  in such a way that the collection of sets  forms an integral self‐affine collection associated with the matrix B and this with a minimum number of pieces  . When used on a given measurable subset K which tiles  by translates of  , this decomposition terminates after finitely many steps if and only if the set K is an integral self‐affine multi‐tile. Furthermore, we show that the minimal decomposition we provide is unique. |
