On the Gaussian traveling wave solution to a special kind of Schrodinger equation with logarithmic nonlinearity

We present the complete analysis of traveling wave solutions to a special kind of nonlinear Schrodinger equation with logarithmic nonlinearity, and obtain all traveling wave solutions. As a result, we prove this equation does not have any Gaussian traveling wave solution. However, by modifying this equation into another form, we can actually obtain a Gaussian traveling wave solution, which verifies the conclusion that existing Gaussian traveling solution requires two restrictions: (1) balance between the dispersion terms and logarithmic nonlinearity; and (2) balance of the parameters.