On a construction of C1(Zp) functionals from Zp-extensions of algebraic number fields
Abstract
Let k be any number field and k∞/k any Zp-extension. We construct a natural = Zp[[ T-1 ]]-morphism from kn× Z Zp into a special subset of C1(Zp)*, the collection of linear functionals on the set of continuously differentiable functions from Zp Cp. We apply the results to the problem of interpolating Gauss sums attached to Dirichlet characters and the explicit annihilation of real ideal classes.
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