Asked by Josh
In discussing Frieze Groups it was assumed that there is a smallest positive translation along the axis. All translations for the pattern form a subgroup. Consider the axis to be the Reals and G to be a subgroup under +. Look at the infimum T of all strictly positive elements of G.
a) Show that if T is not the minimum of the strictly positive elements of G then T=0.Of course if T is minimum then T>0.
a) Show that if T is not the minimum of the strictly positive elements of G then T=0.Of course if T is minimum then T>0.
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