Draft:Bow lemma

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Bow lemma, or Schur's theorem — a theorem in differential geometry of curves. It compares the distance between the endpoints of a space curve ${\displaystyle C^{*}}$ to the distance between the endpoints of a corresponding plane curve ${\displaystyle C}$ of less curvature.

Suppose ${\displaystyle C(s)}$ is a plane curve with curvature ${\displaystyle \kappa (s)}$ which makes a convex curve when closed by the chord connecting its endpoints, and ${\displaystyle C^{*}(s)}$ is a curve of the same length with curvature ${\displaystyle \kappa ^{*}(s)}$. Let ${\displaystyle d}$ denote the distance between the endpoints of ${\displaystyle C}$ and ${\displaystyle d^{*}}$ denote the distance between the endpoints of ${\displaystyle C^{*}}$. If ${\displaystyle \kappa ^{*}(s)\leq \kappa (s)}$ then ${\displaystyle d^{*}\geq d}$.

Schur's theorem is usually stated for ${\displaystyle C^{2}}$ curves, but there are versions for piecewise smooth curves and curves of finite total curvature.

• Schur's lemma (Riemannian geometry)