J. Dittrich scite author profile

Dirac operators with a contact interaction supported by a sphere are studied restricting attention to the operators that are rotationally and space-reflection symmetric. The partial wave operators are constructed using the self-adjoint extension theory, a particular attention being paid to those among them that can be interpreted as δ-function shells of scalar and vector nature. The class of interactions for which the sphere becomes impenetrable is specified and spectral properties of the obtained Hamiltonians are discussed.

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Bound states in straight quantum waveguides with combined boundary conditions

Dittrich

Křı́ž

2002

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We investigate the discrete spectrum of the Hamiltonian describing a quantum particle living in the two-dimensional straight strip. We impose the combined Dirichlet and Neumann boundary conditions on different parts of the boundary. Several statements on the existence or the absence of the discrete spectrum are proven for two models with combined boundary conditions. Examples of eigenfunctions and eigenvalues are computed numerically.

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Non-smoothness of the boundary and the relevant heat kernel coefficients

Nesterenko

Pirozhenko

Dittrich

2003

Class. Quantum Grav.

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The contributions to the heat kernel coefficients generated by the corners of the boundary are studied. For this purpose the internal and external sectors of a wedge and a cone are considered. These sectors are obtained by introducing, inside the wedge, a cylindrical boundary. Transition to a cone is accomplished by identification of the wedge sides. The basic result of the paper is the calculation of the individual contributions to the heat kernel coefficients generated by the boundary singularities. In the course of this analysis certain patterns, that are followed by these contributions, are revealed. The implications of the obtained results in calculations of the vacuum energy for regions with nonsmooth boundary are discussed. The rules for obtaining all the heat kernel coefficients for the minus Laplace operator defined on a polygon or in its cylindrical generalization are formulated.

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Curved planar quantum wires with Dirichlet and Neumann boundary conditions

Dittrich

Křı́ž

2002

J. Phys. A: Math. Gen.

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J. Dittrich

Dirac operators with a spherically symmetric δ-shell interaction

Bound states in straight quantum waveguides with combined boundary conditions

Non-smoothness of the boundary and the relevant heat kernel coefficients

Curved planar quantum wires with Dirichlet and Neumann boundary conditions

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