Linear First-Order Differential-Difference Equations of Retarded Type with Constant Coefficients

Pyeatt, Cynthia R.

08 1900

This paper is concerned with equations in which all derivatives are ordinary rather than partial derivatives. The customary meanings of differential order and difference order of an equation are observed.

differential-difference equations

mathematics

Formal solution of a reduced Kac-van Moerbeke matrix equation

Bradshaw, David J.

01 October 2001

No description available.

Differential difference equations

Mathematics

Asymptotic solutions of almost diagonal differential and difference systems

Xue, Fei,

January 2006

Thesis (Ph. D.)--West Virginia University, 2006. / Title from document title page. Document formatted into pages; contains v, 69 p. Includes abstract. Includes bibliographical references (p. 68-69).

On the classification of integrable differential/difference equations in three dimensions

Roustemoglou, Ilia

January 2015

Integrable systems arise in nonlinear processes and, both in their classical and quantum version, have many applications in various fields of mathematics and physics, which makes them a very active research area. In this thesis, the problem of integrability of multidimensional equations, especially in three dimensions (3D), is explored. We investigate systems of differential, differential-difference and discrete equations, which are studied via a novel approach that was developed over the last few years. This approach, is essentially a perturbation technique based on the so called method of dispersive deformations of hydrodynamic reductions . This method is used to classify a variety of differential equations, including soliton equations and scalar higher-order quasilinear PDEs. As part of this research, the method is extended to differential-difference equations and consequently to purely discrete equations. The passage to discrete equations is important, since, in the case of multidimensional systems, there exist very few integrability criteria. Complete lists of various classes of integrable equations in three dimensions are provided, as well as partial results related to the theory of dispersive shock waves. A new definition of integrability, based on hydrodynamic reductions, is used throughout, which is a natural analogue of the generalized hodograph transform in higher dimensions. The definition is also justified by the fact that Lax pairs the most well-known integrability criteria are given for all classification results obtained.

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