Let $\cal{A}$ denote the family of all twice-differentiable simple open arcs $A$ in $\mathbb{R}^3$ satisfying the following properties: (1) at each point of every arc $A\in\cal{A}$ the curvature of $A$ is at most $1$; (2) no perpendicular projection of $A$ to any plane is an injection. > **Question 1.** What is the infimum of the length $|A|$ of $A\in\cal{A}$ ? > > **Question 2.** Is there an arc $A_{min}$ of minimum length among all arcs in $\cal{A}$? If so, is it unique (up to isometry)? > **Remark.** This question is related to the notion of *rope knots*, see: Hans Stricker, https://mathoverflow.net/q/123170