We consider the nonlinear Schrodinger equation in 2+1 dimensions and an external periodic excitation ns parametric resonance with the frequency of a generic mode. Using an adequate perturbation method we get two coupled equations for the amplitude and phase. We show frequency-response curves and demonstrate the existence for the focusing case of a reverse infinite-period bifurcation when the parametric excitation increases its value. The same bifurcation is possible even in the defocusing case but for a different excitation amplitude value.

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