We solve the Klein-Gordon equation in any D-dimension for the scalar and
vector general Hulth\'{e}n-type potentials with any l by using an
approximation scheme for the centrifugal potential. Nikiforov-Uvarov method is
used in the calculations. We obtain the bound state energy eigenvalues and the
corresponding eigenfunctions of spin-zero particles in terms of Jacobi
polynomials. The eigenfunctions are physical and the energy eigenvalues are in
good agreement with those results obtained by other methods for D=1 and 3
dimensions. Our results are valid for q=1 value when lî€ =0 and for any
q value when l=0 and D=1 or 3. The s% -wave (l=0) binding energies for
a particle of rest mass m0​=1 are calculated for the three lower-lying
states (n=0,1,2) using pure vector and pure scalar potentials.Comment: 25 page