A generalisation of g-rectifying and g-normal curves in Lorentzian n-space

Abstract

In this paper, we introduce and analyze g-rectifying curves (spacelike and null curves) and \ g-normal curves in Lorentzian n-space, building upon the established notion of rectifying curves and normal curve, respectively. Our generalization extends this definition by considering an % g-position vector field, g(s)=∫ g(s)d , where g is an integrable function in the arc-length parameter s. An g-rectifying curves(or g-normal curves) are then defined as an arc-length parametrized curve in Lorentzian n-space such that its g-position vector consistently lies within its rectifying space(or normal space). The primary objective of this work is to provide a comprehensive characterization and classification of these g-rectifying curves and g-normal curves, thereby expanding the geometric understanding of curves in Lorentzian n-spaces.

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