The (1+1)-dimensional F-expansion technique and the homogeneous nonlinear balance principle havebeen generalized and applied for solving exact solutions to a general (3+1)-dimensional nonlinear Schrodinger equation(NLSE) with varying coefficients and a harmonica potential. We found that there exist two kinds of soliton solutions.The evolution features of exact solutions have been numerically studied. The (3+1)D soliton solutions may help us tounderstand the nonlinear wave propagation in the nonlinear media such as classical optical waves and the matter wavesof the Bose-Einstein condensates.
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