Point Interactions in One Dimension and Holonomic Quantum Fields

We analyze the spectral structure of a one-dimensional quantum mechanical system with point interaction, which is known to be parametrized by the group U (2). Based on the classification of the interactions in terms of symmetries, we show, on a general basis, how the fermion-boson duality and the sp

We present a class of self-adjoint extensions of the symmetric operator \(\left.-A \mid C_{0}^{\prime}\left(\mathbb{H}^{\prime} \backslash 0\right\}\right)\) which correspond formally to perturbations of the Laplacian by pseudopotentials involving \(\boldsymbol{d}^{2}\). These operators, which provi

The zero range limit of one dimensional Schrodinger operator is studied by scaling technique and new results are obtained for potentials V with V(z)dz = 0. R ## Eine Bemerkung uber die Punktwechselwirkung in einer Dimension I n h a l tsiibersicht. Wir untersuchen Punktwechselwirkung als Grenzwer