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Mathematical Communications, Vol. 13 No. 2, 2008.

Original scientific paper

The equiform differential geometry of curves in the pseudo-Galilean space

Zlatko Erjavec orcid id orcid.org/0000-0002-9402-1069 ; University of Zagreb, Faculty of Organization and Informatics,Varaždin, Croatia
Blaženka Divjak ; University of Zagreb, Faculty of Organization and Informatics,Varaždin, Croatia

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page 321-332

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Abstract

In this paper the equiform differential
geometry of curves in the pseudo-Galilean space $G^{1}_{3}$ is
introduced. Basic invariants and a moving trihedron are described. Frenet formulas are derived and the fundamental theorem
of curves in equiform geometry of $G^{1}_{3}$ is proved. The curves of constant curvatures are described.

Keywords

pseudo-Galilean space; equiform differential geometry

Hrčak ID:

30895

URI

https://hrcak.srce.hr/30895

Publication date:

23.12.2008.

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