Fuglede's conjecture on cyclic groups of order pn q

Abstract

We show that the spectral set conjecture by Fuglede holds in the setting of cyclic groups of order pn q, where p, q are distinct primes and n≥1. This means that a subset E of such a group G tiles the group by translation (G can be partitioned into translates of E) if and only if there exists an orthogonal basis of L2(E) consisting of group characters. The main ingredient of the present proof is the structure of vanishing sums of roots of unity of order N, where N has at most two prime divisors; the extension of this proof to the case of cyclic groups of order pn qm seems therefore feasible. The only previously known infinite family of cyclic groups, for which Fuglede's conjecture is verified in both directions, is that of cyclic p-groups, i.e. Zpn.