Fabian Brau
Published 2004-01-12Version 1
We obtain, using the Birman-Schwinger method, upper limits on the total number of bound states and on the number of $\ell$-wave bound states of the semirelativistic spinless Salpeter equation. We also obtain a simple condition, in the ultrarelativistic case ($m=0$), for the existence of at least one $\ell$-wave bound states: $C(\ell,p/(p-1))$ $\int_0^{\infty}dr r^{p-1} |V^-(r)|^p\ge 1$, where $C(\ell,p/(p-1))$ is a known function of $\ell$ and $p>1$.
Comments: 18 pages
Journal: Phys. Lett. A313, 363 (2003)
A class of ($\ell$-dependent) potentials with the same number of ($\ell$-wave) bound states
Upper limit on the critical strength of central potentials in relativistic quantum mechanics
On the upper limit of percolation threshold in square lattice
