Supersymmetric partner potentials arising from nodeless half bound states

Abstract

A Half Bound State (HBS) *(x) can be defined as a single, conditional, zero-energy, continuous solution of the one dimensional Schr\"odinger equation for a scattering potential well V(x) (s.t ~ V( ∞)=0). The non-normalizable and solitary HBS of a potential satisfies Neumann boundary condition that '*( ∞)=0 and it can have n (= 0,1,2,...) number of nodes indicating n number of bound states in V(x) below E=0. Here we show that starting with a nodeless HBS, we can construct a (supersymmetric) pair of finite potentials (well, double wells, well-barrier): V(x) having no bound state and they enclose positive area on x-axis. On the contrary their negative counterparts (-cV(x)),c>0 do have at least one bound state for any arbitrary positive value of c. Furthermore, c V(x),~ c >0 which binds positive area on x-axis in conformity with Simon's theorem can have at least one bound state only conditionally for instance when c>1 or c>>1.