THE BEST CONSTANT OF SOBOLEV INEQUALITY WHICH CORRESPONDS TO SCHRÖDINGER OPERATOR WITH DIRAC DELTA POTENTIAL

抄録

We consider boundary value problems for the one-dimensional Schrödinger operator with Dirac delta potential. Green functions G(x, y) are constructed by using the symmetric orthogonalization method, and their aspects as reproducing kernel are also investigated. As an application, the best constants of the corresponding Sobolev inequalities is expressed as the maximum of the diagonal value G(y, y).