On the discrete Fuglede and Pompeiu problems
Gergely Kiss, Romanos Diogenes Malikiosis, Gábor Somlai, Máté Vizer
Abstract
We investigate the discrete Fuglede conjecture and the Pompeiu problem on finite abelian groups and develop a strong connection between the two problems. We give a geometric condition under which a multiset of a finite abelian group has the discrete Pompeiu property. Using this description and the revealed connection we prove that Fuglede’s conjecture holds for [math] , where [math] and [math] are different primes. In particular, we show that every spectral subset of [math] tiles the group. Further, using our combinatorial methods we give a simple proof for the statement that Fuglede’s conjecture holds for [math] .
Topics & Concepts
MathematicsMultisetConjectureAbelian groupConnection (principal bundle)Simple (philosophy)Pure mathematicsStatement (logic)Discrete mathematicsAlgebra over a fieldLimits and Structures in Graph TheoryGeometric and Algebraic TopologyMathematical Analysis and Transform Methods