Special values of p-adic L-functions and Iwasawa λ-invariants of Dirichlet characters

Abstract

We study the Iwasawa λ-invariant of Dirichlet characters of arbitrary order for odd primes p. From special values of the p-adic L-function and its derivative we derive several novel and easily computable criteria to distinguish between the cases λ = 0, λ = 1, λ = 2 and λ ≥ 3. In particular, we look at the case when the p-adic L-function vanishes at s=0. Using formulas of Ferrero-Greenberg and Gross-Koblitz, we give conditions for λp() >1 and λp() > 2. Furthermore, we extend methods of Ernvall-Mets\"ankyl\"a and Dummit et al. to calculate the λ-invariant by twisting with characters of the second kind and using the values of the p-adic L-function at s=2-p, …, 0. In addition, we leverage the value at s=1 to compute λp(). The formulas are also used to obtain numerical data on the distribution of λ-invariants, where either the prime p or the Dirichlet character is fixed.