Quantum Systems with jump-discontinuous mass. I

Abstract: We consider a free quantum particle in one dimension whose mass profile exhibits jump discontinuities. The corresponding Hamiltonian is realised as a self-adjoint extension of the kinetic energy operator formulated in divergence form, with the extension encoded in the boundary conditions at the mass discontinuity points. For a family of scale-free boundary conditions, we analyse the associated spectral problem. We find that the eigenfunctions exhibit a highly sensitive and erratic dependence on the energy, leading to irregular spectral behaviour. Notably, the system supports infinitely many distinct semiclassical limits, each labeled by a point on a spectral curve embedded in the two-torus. These results demonstrate a rich interplay between discontinuous coefficients, boundary data, and spectral asymptotics.