The isospectral fruits of representation theory: quantum graphs and drums

We present a method which enables one to construct isospectral objects, such as quantum graphs and drums. One aspect of the method is based on representation theory arguments which are shown and proved. The complementary part concerns techniques of assembly which are both stated generally and demonstrated. For that purpose, quantum graphs are grist to the mill. We develop the intuition that stands behind the construction as well as the practical skills of producing isospectral objects. We discuss the theoretical implications which include Sunada’s theorem of isospectrality [2] arising as a particular case of this method. A gallery of new isospectral examples is presented and some known examples are shown to result from our theory. PACS numbers: 02.30.Jr, 02.40.Sf, 02.20.-a AMS classification scheme numbers: 35P05, 58J32, 58J53 Submitted to: J. Phys. A: Math. Gen.