Paolo Facchi, Giancarlo Garnero, Marilena Ligabò
Published 2017-03-12Version 1
We establish a bijection between the self-adjoint extensions of the Laplace operator on a bounded regular domain and the unitary operators on the boundary. Each unitary encodes a specific relation between the boundary value of the function and its normal derivative. This bijection sets up a characterization of all physically admissible dynamics of a nonrelativistic quantum particle confined in a cavity. More- over, this correspondence is discussed also at the level of quadratic forms. Finally, the connection between this parametrization of the extensions and the classical one, in terms of boundary self-adjoint operators on closed subspaces, is shown.
On the Theory of Self-Adjoint Extensions of the Laplace-Beltrami Operator, Quadratic Forms and Symmetry
Convergence of operators with deficiency indices $(k,k)$ and of their self-adjoint extensions
All self-adjoint extensions of the magnetic Laplacian in nonsmooth domains and gauge transformations
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