arithmeticity
Arithmeticity is a term used in the study of lattices in Lie groups and algebraic groups. It describes when a discrete subgroup with finite covolume, called a lattice, is defined by arithmetic data from number theory.
Definition. Let G be a linear algebraic group defined over a number field k. For a finite
Examples. The classical example is SL_n(Z) as a lattice in SL_n(R). More generally, for any number field
Theorems and contrasts. A central result is Margulis’s arithmeticity theorem: if G is a connected semisimple
Significance. Arithmeticity connects discrete subgroups to number theory and algebraic groups, underpinning rigidity phenomena and influencing