Constant ratio timelike curves in pseudo-Galilean 3-space \mathbb{G}_{3}^{1}

Autor: Sezgin Büyükkütük, Günay Öztürk, İlim Kişi
Rok vydání: 2018
Předmět:
Zdroj: Creative Mathematics and Informatics. 27:57-62
ISSN: 1843-441X
1584-286X
DOI: 10.37193/cmi.2018.01.08
Popis: In this paper, we consider unit speed timelike curves in pseudo-Galilean 3-space \mathbb{G}_{3}^{1} as curves whose position vectors can be written as linear combination of their Serret-Frenet vectors. We obtain some results of constant ratio curves and give an example of these curves. Further, we show that there is no T-constant curve and we obtain some results of N-constant type of curves in pseudo-Galilean 3-space \mathbb{G}_{3}^{1}.
Databáze: OpenAIRE