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Refined comparison theorems for the Dirac equation in d dimensions

Mathematical Physics 2015-10-06 v1 math.MP Quantum Physics

Abstract

A single spin-12\frac{1}{2} particle obeys the Dirac equation in d1d\ge 1 spatial dimension and is bound by an attractive central monotone potential which vanishes at infinity (in one dimension the potential is even). This work refines the relativistic comparison theorems which were derived by Hall \cite{p75}. The new theorems allow the graphs of the two comparison potentials VaV_a and VbV_b to crossover in a controlled way and still imply the spectral ordering EaEbE_a\le E_b for the eigenvalues at the bottom of each angular momentum subspace. More specifically in a simplest case we have: in dimension d=1d=1, if 0x(Vb(t)Va(t))dt0, x[0, )\int_0^x (V_b(t)-V_a(t)) dt\ge 0,\ x\in [0,\ \infty), then EaEbE_a\le E_b; and in d>1d>1 dimensions, if 0r(Vb(t)Va(t))t2kddt0, r[0, )\int_0^r (V_b(t)-V_a(t))t^{2|k_d|} dt\ge 0,\ r\in [0,\ \infty), where kd=τ(j+d22)k_d=\tau\left(j+\frac{d-2}{2}\right) and τ=±1\tau=\pm 1, then EaEbE_a\le E_b.

Keywords

Cite

@article{arxiv.1506.00486,
  title  = {Refined comparison theorems for the Dirac equation in d dimensions},
  author = {Richard L. Hall and Petr Zorin},
  journal= {arXiv preprint arXiv:1506.00486},
  year   = {2015}
}

Comments

19 pages, 10 figures

R2 v1 2026-06-22T09:44:58.964Z