On curves with nonnegative torsion

Abstract

We provide new results and new proofs of results about the torsion of curves in R3. Let γ be a smooth curve in R3 that is the graph over a simple closed curve in R2 with positive curvature. We give a new proof that if γ has nonnegative (or nonpositive) torsion, then γ has zero torsion and hence lies in a plane. Additionally, we prove the new result that a simple closed plane curve, without any assumption on its curvature, cannot be perturbed to a closed space curve of constant nonzero torsion. We also prove similar statements for curves in Lorentzian R2,1 which are related to important open questions about time flat surfaces in spacetimes and mass in general relativity.