The p-adic valuation of local resolvents, generalized Gauss sums and anticyclotomic Hecke L-values of imaginary quadratic fields at inert primes
Abstract
We prove an asymptotic formula for the p-adic valuation of Hecke L-values of an imaginary quadratic field at an inert prime p along the anticyclotomic Zp-tower. The key is determination of the p-adic valuation of generalized Gauss sums defined using Coates-Wiles homomorphism, and of local resolvents in Zp-extensions. This answers a question of Rubin.
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