Paper 3, Section I, 3G3 G

Geometry and Groups | Part II, 2013

Let Λ\Lambda be a rank 2 lattice in the Euclidean plane. Show that the group GG of all Euclidean isometries of the plane that map Λ\Lambda onto itself is a discrete group. List the possible sizes of the point groups for GG and give examples to show that point groups of these sizes do arise.

[You may quote any standard results without proof.]

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