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10 results on '"George Bluman"'

1. Some Connections between Classical and Nonclassical Symmetries of a Partial Differential Equation and Their Applications

Author

Chaolu Temuer, Laga Tong, and George Bluman

Subjects
classical and nonclassical symmetries, connection, partial differential equation, Mathematics, QA1-939
Abstract

Essential connections between the classical symmetry and nonclassical symmetry of a partial differential equations (PDEs) are established. Through these connections, the sufficient conditions for the nonclassical symmetry of PDEs can be derived directly from the inconsistent conditions of the system determining equations of the classical symmetry of the PDE. Based on the connections, a new algorithm for determining the nonclassical symmetry of a PDEs is proposed. The algorithm make the determination of the nonclassical symmetry easier by adding compatibility extra equations obtained from system of determining equations of the classical symmetry to the system of determining equations of the nonclassical symmetry of the PDE. The findings of this study not only give an alternative method to determine the nonclassical symmetry of a PDE, but also can help for better understanding of the essential connections between classical and nonclassical symmetries of a PDE. Concurrently, the results obtained here enhance the efficiency of the existing algorithms for determining the nonclassical symmetry of a PDE. As applications of the given algorithm, a nonclassical symmetry classification of a class of generalized Burgers equations and the nonclassical symmetries of a KdV-type equations are given within a relatively easier way and some new nonclassical symmetries have been found for the Burgers equations.

Published
2020
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2. Connections Between Symmetries and Conservation Laws

Author

George Bluman

Subjects
conservation laws, linearization, nonlocal symmetries, Noether's theorem, Mathematics, QA1-939
Abstract

This paper presents recent work on connections between symmetries and conservation laws. After reviewing Noether's theorem and its limitations, we present the Direct Construction Method to show how to find directly the conservation laws for any given system of differential equations. This method yields the multipliers for conservation laws as well as an integral formula for corresponding conserved densities. The action of a symmetry (discrete or continuous) on a conservation law yields conservation laws. Conservation laws yield non-locally related systems that, in turn, can yield nonlocal symmetries and in addition be useful for the application of other mathematical methods. From its admitted symmetries or multipliers for conservation laws, one can determine whether or not a given system of differential equations can be linearized by an invertible transformation.

Published
2005

6. Invertible Mappings of Nonlinear PDEs to Linear PDEs through Admitted Conservation Laws.

Author

Stephen Anco, George Bluman, and Thomas Wolf

Subjects
*PARTIAL differential equations, *ALGORITHMS, *MATHEMATICAL mappings, *MATHEMATICAL symmetry
Abstract

Abstract  An algorithmic method using conservation law multipliers is introduced that yields necessary and sufficient conditions to find invertible mappings of a given nonlinear PDE to some linear PDE and to construct such a mapping when it exists. Previous methods yielded such conditions from admitted point or contact symmetries of the nonlinear PDE. Through examples, these two linearization approaches are contrasted. [ABSTRACT FROM AUTHOR]

Published
2008
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7. Differential Equations and Group Methods (James M. Hill)

Author

George Bluman

Subjects
Bernoulli differential equation, Computational Mathematics, Hill differential equation, symbols.namesake, Pure mathematics, Differential equation, Group (mathematics), Applied Mathematics, symbols, Calculus, Theoretical Computer Science, Mathematics
Published
1994

8. Symmetry and Integration Methods for Differential Equations

Author

George Bluman, Stephen Anco, George Bluman, and Stephen Anco

Subjects
Differential equations--Numerical solutions, Differential equations, Partial--Numerical solutions, Lie groups
Abstract

This book is a significant update of the first four chapters of Symmetries and Differential Equations (1989; reprinted with corrections, 1996), by George W. Bluman and Sukeyuki Kumei. Since 1989 there have been considerable developments in symmetry methods (group methods) for differential equations as evidenced by the number of research papers, books, and new symbolic manipulation software devoted to the subject. This is, no doubt, due to the inherent applicability of the methods to nonlinear differential equations. Symmetry methods for differential equations, originally developed by Sophus Lie in the latter half of the nineteenth century, are highly algorithmic and hence amenable to symbolic computation. These methods systematically unify and extend well-known ad hoc techniques to construct explicit solutions for differential equations, especially for nonlinear differential equations. Often ingenious tricks for solving particular differential equations arise transparently from the symmetry point of view, and thus it remains somewhat surprising that symmetry methods are not more widely known. Nowadays it is essential to learn the methods presented in this book to understand existing symbolic manipulation software for obtaining analytical results for differential equations. For ordinary differential equations (ODEs), these include reduction of order through group invariance or integrating factors. For partial differential equations (PDEs), these include the construction of special solutions such as similarity solutions or nonclassical solutions, finding conservation laws, equivalence mappings, and linearizations.

Published
2002

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