The Frenet and Darboux instantaneous rotation vectors for curves on space-like surface (Q1275769)

Summary: In this paper, considering the Darboux instantaneous rotation vector of a solid perpendicular trihedron in Minkowski 3-space \(\mathbb{R}^3_1\), the Frenet instantaneous rotation vector is obtained for the Frenet trihedron of a space-like space curve \(c\) with the binormal \(b\) being a time-like vector. The Darboux derivative formulas and the Darboux instantaneous rotation vector are found when the curve \(c\) is on a space-like surface. A fundamental relation, as a base for the geometry of space-like surfaces, is obtained for the Darboux vectors of the parameter curves \(c_1\), \(c_2\) and an arbitrary curve \(c\) on a space-like surface.