Calculating torsion of an asymptotic curve with nonzero curvature











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I came across this problem when studying Gauss Map:



Show that $tau^2=-K$ on an asymptotic curve. Here $tau$ is torsion of the asymptotic curve $pmb r(u(s),v(s))$(with curvature $kappa$ nonzero) and $K$ is total curvature.



The only thing I can figure out is that since $dpmb{r}$ is an asymptotic direction then principal curvature $k_n=0$. Also I saw another exercise which says in such situation we have: $$tau=frac{1}{sqrt {EG-F^2}}
begin{vmatrix}(dot v)^2 & -dot udot v & (dot u)^2 \
E & F & G \
L & M & N \end{vmatrix}$$

This one I could figure out by calculation. But I can't see any connection between these two expressions.



I know this question has been asked here. But I haven't studied the theorem mentioned in that answer yet. Anyone could give another solution? Thanks in advance!










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    up vote
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    down vote

    favorite












    I came across this problem when studying Gauss Map:



    Show that $tau^2=-K$ on an asymptotic curve. Here $tau$ is torsion of the asymptotic curve $pmb r(u(s),v(s))$(with curvature $kappa$ nonzero) and $K$ is total curvature.



    The only thing I can figure out is that since $dpmb{r}$ is an asymptotic direction then principal curvature $k_n=0$. Also I saw another exercise which says in such situation we have: $$tau=frac{1}{sqrt {EG-F^2}}
    begin{vmatrix}(dot v)^2 & -dot udot v & (dot u)^2 \
    E & F & G \
    L & M & N \end{vmatrix}$$

    This one I could figure out by calculation. But I can't see any connection between these two expressions.



    I know this question has been asked here. But I haven't studied the theorem mentioned in that answer yet. Anyone could give another solution? Thanks in advance!










    share|cite|improve this question
























      up vote
      0
      down vote

      favorite









      up vote
      0
      down vote

      favorite











      I came across this problem when studying Gauss Map:



      Show that $tau^2=-K$ on an asymptotic curve. Here $tau$ is torsion of the asymptotic curve $pmb r(u(s),v(s))$(with curvature $kappa$ nonzero) and $K$ is total curvature.



      The only thing I can figure out is that since $dpmb{r}$ is an asymptotic direction then principal curvature $k_n=0$. Also I saw another exercise which says in such situation we have: $$tau=frac{1}{sqrt {EG-F^2}}
      begin{vmatrix}(dot v)^2 & -dot udot v & (dot u)^2 \
      E & F & G \
      L & M & N \end{vmatrix}$$

      This one I could figure out by calculation. But I can't see any connection between these two expressions.



      I know this question has been asked here. But I haven't studied the theorem mentioned in that answer yet. Anyone could give another solution? Thanks in advance!










      share|cite|improve this question













      I came across this problem when studying Gauss Map:



      Show that $tau^2=-K$ on an asymptotic curve. Here $tau$ is torsion of the asymptotic curve $pmb r(u(s),v(s))$(with curvature $kappa$ nonzero) and $K$ is total curvature.



      The only thing I can figure out is that since $dpmb{r}$ is an asymptotic direction then principal curvature $k_n=0$. Also I saw another exercise which says in such situation we have: $$tau=frac{1}{sqrt {EG-F^2}}
      begin{vmatrix}(dot v)^2 & -dot udot v & (dot u)^2 \
      E & F & G \
      L & M & N \end{vmatrix}$$

      This one I could figure out by calculation. But I can't see any connection between these two expressions.



      I know this question has been asked here. But I haven't studied the theorem mentioned in that answer yet. Anyone could give another solution? Thanks in advance!







      differential-geometry surfaces curves curvature






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      asked Nov 18 at 13:00









      Greywhite

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