Bound states solutions of the Klein-Gordon equation with Hartmann potential and recursion relations | Zendy

Zidong Chen | Zendy; Chen Gang | Zendy

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Bound states solutions of the Klein-Gordon equation with Hartmann potential and recursion relations

Author(s) -

Zidong Chen,

Chen Gang

Publication year - 2005

Publication title -

acta physica sinica

Language(s) - English

Resource type - Journals

SCImago Journal Rank - 0.199

H-Index - 47

ISSN - 1000-3290

DOI - 10.7498/aps.54.2524

Subject(s) - klein–gordon equation , recursion (computer science) , mathematical physics , physics , bound state , quantum mechanics , computer science , algorithm , nonlinear system

The bound state solutions of the Klein_Gordon equation are obtained.When Hartman n_type scalar and vector potentials are equal. It is shown that the radial and a ngular wave functions are respectively expressed by confluent hypergeogetric an d hypergeogetric functions. In addition, two kinds of recursion relations of ra dial wave functions for given ‘principal' and ‘angular-momentum' quantum numb ers are also derived.

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