Commensurability growths of algebraic groups
Abstract
Fixing a subgroup in a group G, the full commensurability growth function assigns to each n the cardinality of the set of subgroups of G with [: ][ : ] ≤ n. For pairs ≤ G, where G is a Chevalley group scheme defined over Z and is an arithmetic lattice in G, we give precise estimates for the full commensurability growth, relating it to subgroup growth and a computable invariant that depends only on G.
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