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This article is cited in 49 scientific papers (total in 49 papers)
Projective transformations and symmetries of differential equation
A. V. Aminova Kazan State University
Abstract:
The group properties of the equations of geodesics on a pseudo-Riemannian manifold $M^n$ are considered, in particular, when these are written as a system of second-order differential equations (resolved with respect to the second derivatives) with third-degree polynomials in the derivatives of the unknown function on the right-hand sides. Each point symmetry of such systems is proved to be a projective transformation. A connection between projective transformation in $M^n$ and symmetries of Hamiltonian systems and Lie–Bäcklund transformations of Hamilton–Jacobi equation with quadratic Hamiltonians is discovered. This provides tools for developing a systematic geometric approach to defining and investigating point and non-point symmetries of large classes of differential equations and partial differential equations and to obtaining their solutions. The dimension of the maximal symmetry group for system of second-order ordinary differential equations resolved with respect to the higher derivatives is found, and this group is proved to be the projective group. As a consequence, the dimension of the maximal symmetry group of the Newton equations is found. In case of three spatial dimensions this group (which is a 24-dimensional projective group) is proved to have as a subgroup the Poincaré group, which is fundamental for special relativity theory.
Received: 09.07.1993
Citation:
A. V. Aminova, “Projective transformations and symmetries of differential equation”, Sb. Math., 186:12 (1995), 1711–1726
Linking options:
https://www.mathnet.ru/eng/sm90https://doi.org/10.1070/SM1995v186n12ABEH000090 https://www.mathnet.ru/eng/sm/v186/i12/p21
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Abstract page: | 1045 | Russian version PDF: | 334 | English version PDF: | 48 | References: | 93 | First page: | 4 |
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