The Quantum Mechanical Problem of a Particle on a Ring with Delta Well
Abstract
The problem of a spin-free electron with mass m, charge e confined onto a ring of radius R0 and with an attractive Dirac delta potential with scaling factor (depth) in non-relativistic theory has closed form analytical solutions. The single bound state function is of the form of a hyperbolic cosine that however contains a parameter d>0 which is the single positive real solution of the transcendental equation (d) = λ d for non zero real λ=2π. The energy eigenvalue of the bound state =-d22π2≈ q e m R02 2. In addition a discretly infinite set of unbounded solutions exists, formally these solutions are obtained from the terms for the bound solution by substituting d i d yielding (d) = λ d as characteristic equation with the corresponding set of solutions dk, k∈N, the respective state functions can be obtained via (x)x i x(x).
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