W. Hereman, U Goktas, and A. Miller. Algorithmic integrability tests for nonlinear differential and lattice equations. Computer Physics Communications, 115:428--446, 1998. Special issue on Computer Algebra in Physics Research.  Home/Search   Document Details and Download   Summary   Related Articles

.... dynamics in (Law 1) Theorem 5 (Classification 1) is gauge invariant under the symmetries of the developmental dynamics in (Law 1) One retains the symmetries, curvatures and conservation laws for those systems, which are not necessarily in divergence form, through the use of symbolic packages [130, 131, 132, 133, 134, 135, 136, 137, 138, 139, 140, 141, 142, 143]. These classifications yield a set of equivalences as in Section 2.1 but now for each closed system another set. Obviously the system category consists of formal systems and of each their symmetries. Actually the functors used in the previous paragraphs can be shown to generate the topological ....

W. Hereman, U Goktas, and A. Miller. Algorithmic integrability tests for nonlinear differential and lattice equations. Computer Physics Communications, 115:428--446, 1998. Special issue on Computer Algebra in Physics Research.

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