Benjamin L. Segal scite author profile

We present an analysis of the stability spectrum of all stationary elliptic-type solutions to the focusing Nonlinear Schrödinger equation (NLS). An analytical expression for the spectrum is given. From this expression, various quantitative and qualitative results about the spectrum are derived. Specifically, the solution parameter space is shown to be split into four regions of distinct qualitative behavior of the spectrum. Additional results on the stability of solutions with respect to perturbations of an integer multiple of the period are given, as well as a procedure for approximating the greatest real part of the spectrum.

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Pattern formation in a model of competing populations with nonlocal interactions

Segal

Volpert

Bayliss

2013

Physica D: Nonlinear Phenomena

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The stability spectrum for elliptic solutions to the sine-Gordon equation

Deconinck¹,

McGill²,

Segal³

2017

Physica D: Nonlinear Phenomena

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We present an analysis of the stability spectrum for all stationary periodic solutions to the sine-Gordon equation. An analytical expression for the spectrum is given. From this expression, various quantitative and qualitative results about the spectrum are derived. Specifically, the solution parameter space is shown to be split into regions of distinct qualitative behavior of the spectrum, in one of which the solutions are stable. Additional results on the stability of solutions with respect to perturbations of an integer multiple of the solution period are given.

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Benjamin L. Segal

The stability spectrum for elliptic solutions to the focusing NLS equation

Pattern formation in a model of competing populations with nonlocal interactions

The stability spectrum for elliptic solutions to the sine-Gordon equation

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