46 research outputs found
On Darboux transformations for the derivative nonlinear Schr\"odinger equation
We consider Darboux transformations for the derivative nonlinear
Schr\"odinger equation. A new theorem for Darboux transformations of operators
with no derivative term are presented and proved. The solution is expressed in
quasideterminant forms. Additionally, the parabolic and soliton solutions of
the derivative nonlinear Schr\"odinger equation are given as explicit examples.Comment: 14 page
Yang-Baxter Maps from the Discrete BKP Equation
We construct rational and piecewise-linear Yang-Baxter maps for a general
N-reduction of the discrete BKP equation
Darboux dressing and undressing for the ultradiscrete KdV equation
We solve the direct scattering problem for the ultradiscrete Korteweg de
Vries (udKdV) equation, over for any potential with compact
(finite) support, by explicitly constructing bound state and non-bound state
eigenfunctions. We then show how to reconstruct the potential in the scattering
problem at any time, using an ultradiscrete analogue of a Darboux
transformation. This is achieved by obtaining data uniquely characterising the
soliton content and the `background' from the initial potential by Darboux
transformation.Comment: 41 pages, 5 figures // Full, unabridged version, including two
appendice
Darboux and binary Darboux transformations for discrete integrable systems 1. Discrete potential KdV equation
The Hirota-Miwa equation can be written in `nonlinear' form in two ways: the
discrete KP equation and, by using a compatible continuous variable, the
discrete potential KP equation. For both systems, we consider the Darboux and
binary Darboux transformations, expressed in terms of the continuous variable,
and obtain exact solutions in Wronskian and Grammian form. We discuss
reductions of both systems to the discrete KdV and discrete potential KdV
equations, respectively, and exploit this connection to find the Darboux and
binary Darboux transformations and exact solutions of these equations
Bäcklund transformations for noncommutative anti-self-dual Yang-Mills equations
We present Bäcklund transformations for the non-commutative anti-self-dual Yang–Mills equations where the gauge group is G = GL(2) and use it to generate a series of exact solutions from a simple seed solution. The solutions generated by this approach are represented in terms of quasi-determinants and belong to a non-commutative version of the Atiyah–Ward ansatz. In the commutative limit, our results coincide with those by Corrigan, Fairlie, Yates and Goddard
B\"acklund Transformations and the Atiyah-Ward ansatz for Noncommutative Anti-Self-Dual Yang-Mills Equations
We present Backlund transformations for the noncommutative anti-self-dual
Yang-Mills equation where the gauge group is G=GL(2) and use it to generate a
series of exact solutions from a simple seed solution. The solutions generated
by this approach are represented in terms of quasideterminants. We also explain
the origins of all of the ingredients of the Backlund transformations within
the framework of noncommutative twistor theory. In particular we show that the
generated solutions belong to a noncommutative version of the Atiyah-Ward
ansatz.Comment: v2: 21 pages, published versio
On pattern structures of the N-soliton solution of the discrete KP equation over a finite field
The existence and properties of coherent pattern in the multisoliton
solutions of the dKP equation over a finite field is investigated. To that end,
starting with an algebro-geometric construction over a finite field, we derive
a "travelling wave" formula for -soliton solutions in a finite field.
However, despite it having a form similar to its analogue in the complex field
case, the finite field solutions produce patterns essentially different from
those of classical interacting solitons.Comment: 12 pages, 3 figure