Abstract
We begin this Lecture with a discussion of a criterion established by H.Weyl in order to verify whether or not a symmetric Schrödinger operator on \(R^+ \) is self-adjoint.
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References
de Olivera, C., & Verra, A. (2009). Annals of Physics, 324, 251–266.
Pauli, W. (1926). Zeitschrift fur Physik, 36, 336–363.
Reed, M., & Simon, B. D. (1992). Methods of Mathematical Physics. Vol. 4. New York: Springer.
Weidmann, K. (1987). Spectral theory of O.D.E. Lecture Notes in Mathematics, 1258, Berlin: Springer Verlag.
Weyl, H. (1910). Mathematische Annalen, 68, 220–269.
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Dell’Antonio, G. (2015). Lecture 18: Weyl’s Criterium, Hydrogen and Helium Atoms. In: Lectures on the Mathematics of Quantum Mechanics I. Atlantis Studies in Mathematical Physics: Theory and Applications, vol 1. Atlantis Press, Paris. https://doi.org/10.2991/978-94-6239-118-5_18
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DOI: https://doi.org/10.2991/978-94-6239-118-5_18
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