Difference schemes with point symmetries and their numerical tests

Bourlioux, Anne; Cyr-Gagnon, C; Winternitz, P.

doi:10.1088/0305-4470/39/22/006

Cited by 39 publications

(78 citation statements)

References 22 publications

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“…00 u 01 u 10 (x 10 − x 00 )(y 01 − y 00 ) + (6.7) +Q (3) 10 u 01 u 00 (x 10 − x 00 )(y 01 − y 00 ) + Q (3) 01 u 00 u 10 (x 10 − x 00 )(y 01 − y 00 ) + +u 00 u 01 u 10 (Q (1) 10 − Q (1) 00 )(y 01 − y 00 ) + u 00 u 01 u 10 (x 10 − x 00 )(Q (2) 01 − Q (2) 00 ).…”

Section: Symmetries Of Rebelo-valiquette Liouville Discretized Equationmentioning

confidence: 99%

Lie-point symmetries of the discrete Liouville equation

Levi

Martina

Winternitz

2014

J. Phys. A: Math. Theor.

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The Liouville equation is well known to be linearizable by a point transformation. It has an infinite dimensional Lie point symmetry algebra isomorphic to a direct sum of two Virasoro algebras. We show that it is not possible to discretize the equation keeping the entire symmetry algebra as point symmetries. We do however construct a difference system approximating the Liouville equation that is invariant under the maximal finite subalgebra SL x (2, R) ⊗ SL y (2, R). The invariant scheme is an explicit one and provides a much better approximation of exact solutions than comparable standard (non invariant) schemes.

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Section: Symmetries Of Rebelo-valiquette Liouville Discretized Equationmentioning

confidence: 99%

Lie-point symmetries of the discrete Liouville equation

Levi

Martina

Winternitz

2014

J. Phys. A: Math. Theor.

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“…The KdV equation then reduces to 15) together with the companion equations (2.11), (2.14). In particular, when k = 1 in (2.12), we obtain the system of differential equations…”

Section: Definition 22mentioning

confidence: 99%

“…For ordinary differential equations, symmetry-preserving schemes have proven to be very promising. For solutions exhibiting sharp variations or singularities, symmetry-preserving schemes systematically appear to outperform standard numerical schemes, [15,16,20,53]. For partial differential equations, the improvement of symmetry-preserving schemes versus traditional integrators is not as clear, [7,52,56,78].…”

Section: Introductionmentioning

confidence: 99%

Symmetry-Preserving Numerical Schemes

Bihlo

Valiquette

2017

Symmetries and Integrability of Difference Equations

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In these lectures we review two procedures for constructing finite difference numerical schemes that preserve symmetries of differential equations. The first approach is based on Lie's infinitesimal symmetry generators, while the second method uses the novel theory of equivariant moving frames. The advantages of both techniques are discussed and illustrated with the Schwarzian differential equation, the Korteweg-de Vries equation and Burgers' equation. Numerical simulations are presented and innovative techniques for obtaining better invariant numerical schemes are introduced. New research directions and open problems are indicated at the end of these notes.

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“…Such realizations are also applicable in the difference schemes for numerical solutions of differential equations [4]. Description of realizations is the first step for solving the Levine's problem [17] on the second-order time-independent Hamiltonian operators which lie in the universal enveloping algebra of a finite-dimensional Lie algebra of the first-order differential operators.…”

Section: Transformation Groups On Real Plane and Their Differential Imentioning

confidence: 99%