Approximation of curves by polygons

Let A be a smooth curve in a Euclidean space E given by an arc length parametrization f: [0, 1] → E. Let π_n = {0 = t₀ ≤ t₁ ≤ … ≤ t_n = 1} be a partition of [0, 1] and let P_n be the polygon with vertices f(t₀), f(t₁),…, f(t_n). Let L(A) and L(P_n) denote the lengths of A and P_n, respectively. The paper investigates the behavior of n² |L(A) ? L(P_n)| when the partition π_n is induced by the sequence nθ(mod 1) for some irrational number θ. It turns out that this behavior depends on the partial quotients of the continued fraction expansion of θ.