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

被引：11

作者：

Khadjiev, Djavvat ^{[1
]}

Oren, Idris ^{[1
]}

Peksen, Omer ^{[1
]}

机构：

[1] Karadeniz Tech Univ, Dept Math, TR-61080 Trabzon, Turkey

来源：

TURKISH JOURNAL OF MATHEMATICS | 2013年 / 37卷 / 01期

关键词：

Curve; differential invariant; pseudo-Euclidean geometry; Minkowski geometry; NULL CURVES;

D O I：

10.3906/mat-1104-41

中图分类号：

O1 [数学];

学科分类号：

0701 ; 070101 ;

摘要：

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.

引用

页码：80 / 94

页数：15

共 22 条

[11]

Ferrandez A., 2002, P 3 INT C GEOM INT Q, P209

[12] On the differential geometry of time-like curves in Minkowski spacetime [J].

Formiga, J. B. ;

Romero, C. .

AMERICAN JOURNAL OF PHYSICS, 2006, 74 (11) :1012-1016

[13]

Ichimura H., 1987, HADRONIC J S, V3

[14]

Inoguchi J, 2008, INT ELECTRON J GEOM, V1, P40

[15]

Kaplansky I., 1957, INTRO DIFFERENTIAL A

[16] The complete system of global integral and differential invariants for equi-affine curves [J].

Khadjiev, D ;

Peksen, Ö .

DIFFERENTIAL GEOMETRY AND ITS APPLICATIONS, 2004, 20 (02) :167-175

[17]

Khadjiev D., APPL INVARIANT THEOR

[18]

Peksen O., 2011, TURK J MATH IN PRESS, V35, P1

[19]

Petrovic-Torgasev M, 2006, J GEOM, V84, P106, DOI 10.1007/s00022-005-0024-y

[20] LOCAL DIFFERENTIAL GEOMETRY OF NULL CURVES IN CONFORMALLY FLAT SPACE-TIME [J].

URBANTKE, H .

JOURNAL OF MATHEMATICAL PHYSICS, 1989, 30 (10) :2238-2245

← 1 2 3 →