Gaps in the spectrum of a periodic quantum graph with periodically distributed δ'-type interactions

Abstract

We consider a family of quantum graphs \(,A)\>0, where is a Zn-periodic metric graph and the periodic Hamiltonian A is defined by the operation --1 d 2 d x2 on the edges of and either δ'-type conditions or the Kirchhoff conditions at its vertices. Here >0 is a small parameter. We show that the spectrum of A has at least m gaps as 0 (m∈N is a predefined number), moreover the location of these gaps can be nicely controlled via a suitable choice of the geometry of and of coupling constants involved in δ'-type conditions.