3 edition of **Symmetries and related topics in differential and difference equations** found in the catalog.

Symmetries and related topics in differential and difference equations

Jairo Charris Seminar (2009 Universidad Sergio Arboleda)

- 265 Want to read
- 20 Currently reading

Published
**2011**
by American Mathematical Society, Instituto de Matemáticas y sus Aplicaciones in Providence, R.I, [Bogotá, Colombia]
.

Written in

- Difference and functional equations -- Difference equations -- Difference equations, scaling ($q$-differences),
- Differential geometry -- Classical differential geometry -- Curves in Euclidean space,
- Topological groups, Lie groups -- Noncompact transformation groups -- General theory of group and pseudogroup actions,
- Symmetry (Mathematics),
- Dynamical systems and ergodic theory -- Finite-dimensional Hamiltonian, Lagrangian, contact, and nonholonomic systems -- General theory, relations with symplectic geometry and topology,
- Mechanics of particles and systems -- Axiomatics, foundations -- Axiomatics, foundations,
- Difference equations,
- Ordinary differential equations -- Differential equations in the complex domain -- Algebraic aspects (differential-algebraic, hypertranscendence, group-theoretical),
- Congresses,
- Differential-algebraic equations,
- Partial differential equations -- Representations of solutions -- Solutions in closed form,
- Nonassociative rings and algebras -- Lie algebras and Lie superalgebras -- Lie algebras of linear algebraic groups,
- Partial differential equations -- General topics -- Geometric theory, characteristics, transformations

**Edition Notes**

Includes bibliographical references and index.

Statement | David Blazquez-Sanz, Juan J. Morales-Ruiz, Jesus Rodriguez Lombardero, editors |

Series | Contemporary mathematics -- v. 549 |

Contributions | Blazquez-Sanz, David, 1980-, Morales Ruiz, Juan J. (Juan José), 1953-, Lombardero, Jesus Rodriguez, 1961- |

Classifications | |
---|---|

LC Classifications | QA174.7.S96 J35 2009 |

The Physical Object | |

Pagination | p. cm. |

ID Numbers | |

Open Library | OL24842284M |

ISBN 10 | 9780821868720 |

LC Control Number | 2011012079 |

Continuous symmetries of difference equations. Decio Levi 1 and Pavel Winternitz 2. Associated with any symmetry group there will be a whole class of nonlinear differential–difference equations related to each other by point transformations. To simplify the results, we will just look for the simplest element of a given class of nonlinear. Intended for researchers, numerical analysts, and graduate students in various fields of applied mathematics, physics, mechanics, and engineering sciences, Applications of Lie Groups to Difference Equations is the first book to provide a systematic construction of invariant difference schemes for nonlinear differential equations.

Get this from a library! Symmetries and integrability of difference equations. [D Levi;] -- "Difference equations are playing an increasingly important role in the natural sciences. Indeed many phenomena are inherently discrete and are naturally described by difference equations. Phenomena. Conservation laws are also called first integrals when dealing with ordinary differential equations (ODEs). We explore the complementary nature of symmetry analysis and conservation laws; specifically, the use of symmetries to find integrating factors and, conversely, the use of conservation laws to seek new by: 2.

This is an accessible book on advanced symmetry methods for partial differential equations. Topics include conservation laws, local symmetries, higher-order symmetries, contact transformations, delete "adjoint symmetries," Noether’s theorem, local mappings, nonlocally related PDE systems, potential symmetries, nonlocal symmetries, nonlocal conservation laws, nonlocal mappings, and the. Buy Symmetries and Differential Equations (Applied Mathematical Sciences) 1st ed. Corr. 2nd printing by George W. Bluman, Sukeyuki Kumei (ISBN: ) from Amazon's Book Store. Everyday low prices and free delivery on eligible orders.

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A major portion of this book discusses work which has appeared since the publication of the book Similarity Methods for Differential Equations, Springer-Verlag,by the first author and J.D.

present book also includes a thorough and comprehensive treatment of Lie groups of tranformations and their various uses for solving ordinary and partial differential by: Difference equations are playing an increasingly important role in the natural sciences.

Indeed, many phenomena are inherently discrete and thus naturally described by difference equations. More fundamentally, in subatomic physics, space-time may actually be discrete. Differential equations would then just be approximations of more basic discrete ones.

Moreover, when using differential equations Format: Paperback. The papers include topics such as Lie symmetries, equivalence transformations and differential invariants, group theoretical methods in linear equations, namely differential Galois theory and Stokes phenomenon, and the development of some geometrical methods in theoretical physics.

Get this from a library. Symmetries and related topics in differential and difference equations: Jairo Charris SeminarSymmetries of Differential and Difference Equations, Escuela de Matemáticas, Universidad Sergio Arboleda, Bogotá, Colombia.

[Jairo A Charris Castañeda; David Blázquez-Sanz; Juan J Morales Ruiz; Jesús Rodríguez Lombardero; American Mathematical Society. As a survey of the current state of the art, this book will serve as a valuable reference and is particularly well suited as an introduction to the field of symmetries and integrability of difference equations.

Therefore, the book will be welcomed by advanced undergraduate and graduate students as well as by more advanced : Hardcover.

The present book also includes a thorough and comprehensive treatment of Lie groups of tranformations and their various uses for solving ordinary and partial differential equations. No knowledge of group theory is assumed.

Emphasis is placed on explicit computational algorithms to discover symmetries admitted by. Symmetries and Integrability of Difference Equations. This book is devoted to a topic that has undergone rapid and fruitful development over the last few years: symmetries and integrability of difference equations and \(q\)-difference equations and the theory of special functions that occur as solutions of such equations.

Symmetries and Integrability of Difference Equations. Difference equations are playing an increasingly important role in the natural sciences.

Indeed many phenomena are inherently discrete and are naturally described by difference equations. Phenomena described by differential equations are therefore approximations of more basic discrete ones. Otieno Andrew. A theorem due to Nail H. Ibragimov () provides a connection between symmetries and conservation laws for arbitrary differential equations.

The theorem is valid for any system of differential equations provided that the number of equations is. The topic of this article is the symmetry analysis of differential equations and the applications of computer algebra to the extensive analytical calculations which are usually involved in it.

The whole area naturally decomposes into two parts depending on whether ordinary or partial differential equations Cited by: As a survey of the current state of the art, this book will serve as a valuable reference and is particularly well suited as an introduction to the field of symmetries and integrability of difference equations.

Therefore, the book will be welcomed by advanced undergraduate and graduate students as well as by more advanced researchers. This approach is fruitful mainly for differential-difference equations (D∆E's), where not only the dependent variables, but also some of the independent ones are continuous.

Section 3 is devoted to generalized point symmetries on fixed lattices [63, 64, 93, ]. The concept of symmetry is generalized in. It is suitable for graduate students and researchers in difference equations and related topics. Titles in this series are co-published with the Fields Institute for Research in Mathematical Sciences (Toronto, Ontario, Canada).

Difference equations by differential equations methods Article (PDF Available) in Journal of Difference Equations and Applications 22(5) October Author: Hassan Sedaghat. Form Symmetries and Reduction of Order in Difference Equations presents a new approach to the formulation and analysis of difference equations in which the underlying space is typically an algebraic group.

In some problems and applications, an additional algebraic or topological structure is assumed in order to define equations and obtain significant results about cturer: CRC Press. SIDE 13 is the thirteenth in a series of biennial conferences devoted to Symmetries and Integrability of Difference Equations, and in particular to: ordinary and partial difference equations, analytic difference equations, orthogonal polynomials and special functions, symmetries and reductions, discrete differential geometry, integrable.

A REDUCE package for determining the group of Lie symmetries of an arbitrary system of partial differential equations is described. It may be used both interactively and in a batch mode.

Symmetries of DiﬀerentialEquations In this chapter we discuss the foundations and some applications of Lie’s theory of symmetry groups of diﬀerential equations. The basic inﬁnitesimal method for calculating symmetry groups is presented, and used to determine the general symmetry group of some particular diﬀerential equations of Size: KB.

Written by the world's leading experts in the field, this up-to-date sourcebook covers topics such as Lie-Bäcklund, conditional and non-classical symmetries, approximate symmetry groups for equations with a small parameter, group analysis of differential equations with distributions, integro-differential equations, recursions, and symbolic.

There has in recent years been a remarkable growth of interest in the area of discrete integrable systems. Much progress has been made by applying symmetry groups to the study of differential equations, and connections have been made to other topics such as numerical methods, cellular automata and mathematical physics.

The Lie algebra approach to symmetries of integro-differential equations is not a new subject, and there is a quite extensive available literature [13][14] [15]. However, in contrast to the local.A review of the role of symmetries in solving differential equations is presented.

After showing some recent results on the application of classical Lie point symmetries to problems in fluid draining, meteorology, and epidemiology of AIDS, the nonclassical symmetries method is by: Symmetry analysis for differential equations was developed by Sophus Lie in the latter half of the nineteenth century.

It systematically unifies and extends the well-known ad hoc methods to construct closed form solutions for differential equations, in particular for nonlinear differential equations.