Relativistic Comparison Theorems
Mathematical Physics
2015-05-18 v1 math.MP
Atomic Physics
Quantum Physics
Abstract
Comparison theorems are established for the Dirac and Klein--Gordon equations. We suppose that V^{(1)}(r) and V^{(2)}(r) are two real attractive central potentials in d dimensions that support discrete Dirac eigenvalues E^{(1)}_{k_d\nu} and E^{(2)}_{k_d\nu}. We prove that if V^{(1)}(r) \leq V^{(2)}(r), then each of the corresponding discrete eigenvalue pairs is ordered E^{(1)}_{k_d\nu} \leq E^{(2)}_{k_d\nu}. This result generalizes an earlier more restrictive theorem that required the wave functions to be node free. For the the Klein--Gordon equation, similar reasoning also leads to a comparison theorem provided in this case that the potentials are negative and the eigenvalues are positive.
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Cite
@article{arxiv.1004.1109,
title = {Relativistic Comparison Theorems},
author = {Richard L. Hall},
journal= {arXiv preprint arXiv:1004.1109},
year = {2015}
}
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6 pages