Extremal elasticity of quadratic orders

Abstract

We study how large and small elasticity can be for orders belonging to a fixed quadratic field, in terms of the corresponding conductors. For example, we show that if K is an imaginary quadratic field, then the order of conductor f in K has elasticity exceeding (f)c1 f for all f that are sufficiently large. On the other hand, this elasticity is smaller than (f)c2f for infinitely many f. Here c1, c2 are universal positive constants. The proofs borrow methods from analytic number theory previously employed to study statistics of the multiplicative groups (Z/mZ)×.

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