| Article ID | Journal | Published Year | Pages | File Type |
|---|---|---|---|---|
| 4606363 | Differential Geometry and its Applications | 2011 | 5 Pages |
Let M(n,p)M(n,p) be the group of all transformations of an n -dimensional pseudo-Euclidean space Epn of index p generated by all pseudo-orthogonal transformations and parallel translations of Epn. Definitions of a pseudo-Euclidean type of a null curve, an invariant parametrization of a null curve and an M(n,p)M(n,p)-equivalence of curves are introduced. All possible invariant parametrizations of a null curve with a fixed pseudo-Euclidean type are described. The problem of the M(n,p)M(n,p)-equivalence of null curves is reduced to that of null paths. Global conditions of the M(n,p)M(n,p)-equivalence of null curves are given in terms of the pseudo-Euclidean type of a null curve and the system of polynomial differential M(n,p)M(n,p)-invariants of a null curve x(s)x(s).
