Singular solutions of the L2-supercritical biharmonic nonlinear Schrödinger equation
We use asymptotic analysis and numerical simulations to study peak-type singular solutions
of the supercritical biharmonic nonlinear Schrödinger equation. These solutions have a
quartic-root blowup rate, and collapse with a quasi-self-similar universal profile, which is a
zero-Hamiltonian solution of a fourth-order nonlinear eigenvalue problem.
of the supercritical biharmonic nonlinear Schrödinger equation. These solutions have a
quartic-root blowup rate, and collapse with a quasi-self-similar universal profile, which is a
zero-Hamiltonian solution of a fourth-order nonlinear eigenvalue problem.
Abstract
We use asymptotic analysis and numerical simulations to study peak-type singular solutions of the supercritical biharmonic nonlinear Schrödinger equation. These solutions have a quartic-root blowup rate, and collapse with a quasi-self-similar universal profile, which is a zero-Hamiltonian solution of a fourth-order nonlinear eigenvalue problem.
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