Some properties of the nonlinear coherent states (NCS), recognized by Vogel
and de Mates Filho as dark states of a trapped ion, are extended to NCS on
a circle, for which the Wigner functions are presented. These states are o
btained by applying a suitable displacement operator D-h(alpha) to the vacu
um state. The unity resolutions in terms of the projectors \alpha ,h][alpha
,h(-1)\,\alpha ,h(-1)][alpha ,h\ are presented together with a measure all
owing a resolution in terms of \alpha ,h][alpha ,h\. D-h(alpha) is also use
d for introducing the probability distribution funtion rho (A,h)(z) while t
he existence of a measure is exploited for extending the P representation t
o these states. The weight of the nth Fock state of the NCS relative to a t
rapped ion with Lamb-Dicke parameter eta, oscillates so wildly as n grows u
p to infinity that the normalized NCS fill the open circle eta (-1) in the
complex alpha plane. In addition, this prevents the existence of a measure
including normalizable states only. This difficulty is overcome by introduc
ing a family of deformations that are rational functions of n, each of them
admitting a measure. By increasing the degree of-these rational approximat
ions, the deformation of a trapped ion can be approximated with any degree
of accuracy and the formalism of the P representation can be applied.