Add to ORKGWe degenerate solutions of the NLS equation from the general formulation in terms of theta functions to get quasi-rational solutions of NLS equations. For this we establish a link between Fredholm determinants and Wronskians. We give solutions of the NLS equation as a quotient of two wronskian determinants. In the limit when some parameter goes to $0$, we recover Akhmediev's solutions given recently It gives a new approach to get the well known rogue waves
Quasi-rational solutions to the defocusing nonlinear Schrödinger equation (dNLS) in terms of wronski...
This work is a continuation of a recent paper in which we have constructed a multi-parametric family...
This work is a continuation of a recent paper in which we have constructed a multi-parametric family...
We degenerate solutions of the NLS equation from the general formulation in terms of theta functions...
We degenerate solutions of the NLS equation from the general formulation in terms of theta functions...
We degenerate solutions of the NLS equation from the general formulation in terms of theta functions...
We degenerate solutions of the NLS equation from the general formulation in terms of theta functions...
We degenerate solutions of the NLS equation from the general formulation in terms of theta functions...
We present a new representation of solutions of the focusing NLS equation as a quotient of two deter...
We present a new representation of solutions of the focusing NLS equation as a quotient of two deter...
We present a new representation of solutions of the focusing NLS equation as a quotient of two deter...
We present a new representation of solutions of the focusing NLS equation as a quotient of two deter...
Quasi-rational solutions to the defocusing nonlinear Schrödinger equation (dNLS) in terms of wronski...
Quasi-rational solutions to the defocusing nonlinear Schrödinger equation (dNLS) in terms of wronski...
This work is a continuation of a recent paper in which we have constructed a multi-parametric family...
Quasi-rational solutions to the defocusing nonlinear Schrödinger equation (dNLS) in terms of wronski...
This work is a continuation of a recent paper in which we have constructed a multi-parametric family...
This work is a continuation of a recent paper in which we have constructed a multi-parametric family...
We degenerate solutions of the NLS equation from the general formulation in terms of theta functions...
We degenerate solutions of the NLS equation from the general formulation in terms of theta functions...
We degenerate solutions of the NLS equation from the general formulation in terms of theta functions...
We degenerate solutions of the NLS equation from the general formulation in terms of theta functions...
We degenerate solutions of the NLS equation from the general formulation in terms of theta functions...
We present a new representation of solutions of the focusing NLS equation as a quotient of two deter...
We present a new representation of solutions of the focusing NLS equation as a quotient of two deter...
We present a new representation of solutions of the focusing NLS equation as a quotient of two deter...
We present a new representation of solutions of the focusing NLS equation as a quotient of two deter...
Quasi-rational solutions to the defocusing nonlinear Schrödinger equation (dNLS) in terms of wronski...
Quasi-rational solutions to the defocusing nonlinear Schrödinger equation (dNLS) in terms of wronski...
This work is a continuation of a recent paper in which we have constructed a multi-parametric family...
Quasi-rational solutions to the defocusing nonlinear Schrödinger equation (dNLS) in terms of wronski...
This work is a continuation of a recent paper in which we have constructed a multi-parametric family...
This work is a continuation of a recent paper in which we have constructed a multi-parametric family...