On large Iwasawa λ-invariants of imaginary quadratic function fields

Abstract

Let be a prime number and q be a power of . Given an odd prime number p and an imaginary quadratic extension F of the rational function field Fq(T), let λp(F) denote the Iwasawa λ-invariant of the constant Zp-extension of F. We show that for any number r>0 and all large enough values of q 1p, there is a positive proportion of imaginary quadratic fields F/Fq(T) with the property that λp(F)≥ r. The main result is proved as a consequence of recent unconditional theorems of Ellenberg-Venkatesh-Westerland on the distribution of class groups of imaginary quadratic function fields.

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