Helix of a curve: Difference between revisions

Definition

Let ${\displaystyle \gamma }$ be a parametrized curve on a manifold ${\displaystyle M}$. The helix or spiral of ${\displaystyle \gamma }$ is a parametrized curve in ${\displaystyle \mathbb{R}\times M}$ that sends ${\displaystyle t}$ in the parameter domain to ${\displaystyle (t,f(t))}$. In other words, the helix of a curve is the Cartesian product of the curve with the identity-parametrized curve.

Note that the above definition requires a parametrized curve. However, for a Riemannian manifold, any smooth curve in the manifold acquires a natural parametrization by arc-length, and we can thus give a natural choice of helix, or spiral, associated with the curve.

For a closed curve, viz a map ${\displaystyle S^1\to M}$, we construct the helix using the map ${\displaystyle \mathbb{R}\to M}$ that composes the modulo map with the curve parametrization.