A variable coefficient nonlinear Schr\"odinger equation with a four-dimensional symmetry group and blow-up of its solutions
Abstract
A canonical variable coefficient nonlinear Schr\"odinger equation with a four dimensional symmetry group containing (2,R) group as a subgroup is considered. This typical invariance is then used to transform by a symmetry transformation a known solution that can be derived by truncating its Painlev\'e expansion and study blow-ups of these solutions in the Lp-norm for p>2, L∞-norm and in the sense of distributions.
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