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Generating systems of differential invariants and the theorem on existence for curves in the pseudo-Euclidean geometry}

Djavvat KhadjievDepartment of Mathematics, Karadeniz Technical University, Trabzon, 61080, Turkeyİdri̇s ÖrenDepartment of Mathematics, Karadeniz Technical University, Trabzon, 61080, TurkeyÖmer PekşenDepartment of Mathematics, Karadeniz Technical University, Trabzon, 61080, Turkey
2013en
ABI

Аннотация

Let M(n, p) be the group of all motions of an n-dimensional pseudo-Euclidean space of index p. It is proved that the complete system of M(n,p)-invariant differential rational functions of a path (curve) is a generating system of the differential field of all M(n,p)-invariant differential rational functions of a path (curve), respectively. A fundamental system of relations between elements of the complete system of M(n,p)-invariant differential rational functions of a path (curve) is described.

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