Mathematics Tripos Papers

  • Part IA
  • Part IB
  • Part II
  • FAQ

1.I.3G

Geometry of Group Actions | Part II, 2008

Prove that an isometry of Euclidean space R3\mathbb{R}^{3}R3 is an affine transformation.

Deduce that a finite group of isometries of R3\mathbb{R}^{3}R3 has a common fixed point.

Typos? Please submit corrections to this page on GitHub.