Relativistic Kramers-Pasternack Recurrence Relations

Andrae D; Askey R A; Atakishyev N M; Bailey W N; Baz A I; Bethe H A; Blanchard P; Cordero-Soto R Suslov S K; Ding Yi-B; Erdélyi A; Gumberidze A; Karlin S; Karshenboim S G; Karshenboim S G; Koekoek R Swarttouw R F; Kramers H A; Kramers H A; Landau L D; Liboff R L; Messiah A; More R M; Moreno B; Nikiforov A F; Nikiforov A F; Núñez-Yépez H N; Ojha P C; Pasternack S; Perelomov A M; Qiang W-C; Sergei K Suslov; Shabaev V M; Shabaev V M; Shabaev V M; Shabaev V M; Shabaev V M; Suslov S K; Swainson R A; Tchebychef P L; Tchebychef P L; Tchebychef P L; Tchebychef P L; Tchebychef P L; Tchebychef P L

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Relativistic Kramers-Pasternack Recurrence Relations

Abstract

Recently we have evaluated the matrix elements

,

where

O

={1,\beta, i\mathbf{\alpha n}\beta}

are the standard Dirac matrix operators and the angular brackets denote the quantum-mechanical average for the relativistic Coulomb problem, in terms of generalized hypergeometric functions

_{3}F_{2}(1) $ for all suitable powers and established two sets of Pasternack-type matrix identities for these integrals. The corresponding Kramers--Pasternack three-term vector recurrence relations are derived here.Comment: 12 pages, no figures Will appear as it is in Journal of Physics B: Atomic, Molecular and Optical Physics, Special Issue on Hight Presicion Atomic Physic

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