Properties of weakly collapsing solutions to the nonlinear Schrödinger equation
Abstract
It is shown that one of the conditions for a weakly collapsing solution with zero energy produces an infinite number of functionals IN identically vanishing on the regular solutions to the corresponding differential equation. On the parameter plane {A, C1}, there are at least two singular lines. Along one of these lines (A/C1=1/6), are located weakly collapsing solutions with zero energy. It is assumed that, along the second line (A/C1=αc), another family of weakly collapsing solutions with zero energy is located. In the domain of large values of the parameters C1, α=A/C1, there exists a domain of an intermediate asymptotic form, where the amplitude of oscillations of the function U grows in a large domain relative to the ξ coordinate.
- Publication:
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Soviet Journal of Experimental and Theoretical Physics
- Pub Date:
- May 2003
- DOI:
- 10.1134/1.1581953
- Bibcode:
- 2003JETP...96..975O
- Keywords:
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- Spectroscopy;
- Differential Equation;
- State Physics;
- Field Theory;
- Elementary Particle