Bounded and measurable common fundamental domains for two lattices

Abstract

Suppose that L, M are two full-rank lattices in Euclidean space with vol(L)=vol(M). We give a new proof on the existence of a bounded and Lebesgue measurable set that tiles Rd with both L,M using the measurable Hall's Theorem which was proved by T.Ci\'esla and M. Sabok. This proof is direct and does not go through the intermediate results on cut-and-project sets involved in the proof given by S.Grepstad and M.Kolountzakis. We also show the existence of a bounded, set-theoretic (i.e., not necessarily measurable) common fundamental domain of L,M assuming only that vol(L)=vol(M). Combining these results we show the existence of a bounded and Lebesgue measurable common fundamental domain for any two full-rank lattices of equal volumes. Finally we show that a set-theoretic bounded, common fundamental domain cannot exist when vol(L)≠ vol(M).