Reply to: “Comment on: ‘Any l-state solutions of the Klein–Gordon equation with the generalized Hulthén potential’ [Phys. Lett. A 371 (2007) 201]” [Phys. Lett. A 372 (2008) 7199]

“…As many authors suggested, [4][5][6][7][8][9][10][11][12][13][14][15][16] there is a simple and direct way of solving Eq. (9) without iteration.…”

“…In order to understand the relativistic effects in nuclear chemistry or physics, the bound state solutions of the Klein-Gordon equation have been frequently investigated. For the potentials such as linear, [4][5][6] exponential, [5][6][7][8] Coulomb, 9,10 Hulthén, [11][12][13][14] Rosen-Morse, 15,16 etc., the exact bound state solutions of the one-dimensional Klein-Gordon equation have been reported. It is also reported that the one-dimensional Klein-Gordon equation with shape invariant vector and scalar potentials can be exactly solved.…”

“…It is also reported that the one-dimensional Klein-Gordon equation with shape invariant vector and scalar potentials can be exactly solved. [3][4][5][6][7]11,17 The approximate bound state solutions of the Klein-Gordon equation for more complex potentials or for one-dimensional potentials with centrifugal term are also investigated. 11,[18][19][20][21][22][23] The nonrelativistic Schrödinger equation corresponding to the above relativistic Klein-Gordon …”

Nonrelativistic Solutions of Morse Potential from Relativistic Klein-Gordon Equation

“…As many authors suggested, [4][5][6][7][8][9][10][11][12][13][14][15][16] there is a simple and direct way of solving Eq. (9) without iteration.…”

“…In order to understand the relativistic effects in nuclear chemistry or physics, the bound state solutions of the Klein-Gordon equation have been frequently investigated. For the potentials such as linear, [4][5][6] exponential, [5][6][7][8] Coulomb, 9,10 Hulthén, [11][12][13][14] Rosen-Morse, 15,16 etc., the exact bound state solutions of the one-dimensional Klein-Gordon equation have been reported. It is also reported that the one-dimensional Klein-Gordon equation with shape invariant vector and scalar potentials can be exactly solved.…”

“…It is also reported that the one-dimensional Klein-Gordon equation with shape invariant vector and scalar potentials can be exactly solved. [3][4][5][6][7]11,17 The approximate bound state solutions of the Klein-Gordon equation for more complex potentials or for one-dimensional potentials with centrifugal term are also investigated. 11,[18][19][20][21][22][23] The nonrelativistic Schrödinger equation corresponding to the above relativistic Klein-Gordon …”

Nonrelativistic Solutions of Morse Potential from Relativistic Klein-Gordon Equation

“…The solutions of the Schrödinger equation has been studied by using different methods based on perturbative and non-perturbative approaches [1][2][3][4][5]. The Klein-Gordon (KG) and Dirac equations have been also studied for different type of potentials such as Aharonov-Bohm (AB) potential [6], the AB plus Dirac monopole potential [7,11], generalized Hulthen, harmonic, and linear potentials, generalized asymmetrical Hartmann potentials, for a uniform magnetic field, pseudoharmonic oscillator, and exponential-type potentials [12][13][14][15][16][17][18][19][20].…”

Effective-mass Klein–Gordon equation for non-PT/non-Hermitian generalized Morse potential

“…The potential has successfully accounted for some of the existing data in nuclear, particle, atomic, condensed matter, and chemical physics and has therefore been the subject of some related works in both nonrelativistic and relativistic regimes [23][24][25][26]. The Hulthén potential is a special case of the ManningRosen potential.…”

Pseudospin Symmetry of the Position-Dependent Mass Dirac Equation for the Hulthén Potential and Yukawa Tensor Interaction