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Paper detail

Tame class field theory over local fields

For a quasi-projective scheme $X$ admitting a smooth compactification over a local field of residue characteristic $p > 0$, we construct a continuous reciprocity homomorphism from a tame class group to the abelian tame etale fundamental group of $X$. We describe the prime-to-$p$ parts of its kernel and cokernel. This generalizes the higher dimensional unramified class field theory over local fields by Jannsen-Saito and Forre. We also prove a finiteness theorem for the geometric part of the abelian tame etale fundamental group, generalizing the results of Grothendieck and Yoshida for the unramified fundamental group.

preprint2026arXivOpen access
Rahul GuptaAmalendu KrishnaJitendra Rathore
math.AG
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Rahul GuptaAmalendu KrishnaJitendra Rathore

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