Density of shapes of periodic tori in the cubic case
Abstract
Consider the compact orbits of the R2 action of the diagonal group on SL(3,R)/SL(3,Z), the so-called periodic tori. For any periodic torus, the set of periods of the orbit forms a lattice in R2. Such a lattice, re-scaled to covolume one, gives a shape point in SL(2,R)/SL(2,Z). We prove that the shapes of all periodic tori are dense in SL(2,R)/SL(2,Z). This implies the density of shapes of the unit groups of totally real cubic orders.
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