Beta Critical for the Schrodinger Operator with Delta Potential

Rajan Puri

Published 2020-03-07Version 1

For the one dimensional Schr\"odinger operator in the case of Dirichlet boundary condition, we show that $\beta_{cr}$ is positive and zero for the case of Neumann and Robin boundary condition considering the potential energy of the form $V(x)=-\beta \delta(x-a)$ where, $\beta \geq 0, \ a > 0.$ We prove that the $\beta_{cr}$ goes to infinity when the delta potential moves towards the boundary in dimension one with Dirichlet boundary condition. We also show that the $\beta_{cr}>0$ and $\beta \in (0,\frac{1}{2})$ considering Dirichlet problem with delta potential on the circle in dimension two.