E. Nart
Published 2014-09-15Version 1
Types over a discrete valued field $(K,v)$ are computational objects that parameterize certain families of monic irreducible polynomials in $K_v[x]$, where $K_v$ is the completion of $K$ at $v$. Two types are considered to be equivalent if they encode the same family of prime polynomials. In this paper, we characterize the equivalence of types in terms of certain data supported by them.
Character sums over products of prime polynomials
Surprising symmetries in distribution of prime polynomials
Small gaps between configurations of prime polynomials
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