Journal of the Ramanujan Mathematical Society

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Tame Ramification and Group Cohomology


Affiliations
1 Harish-Chandra Research Institute, Chhatnag Road, Jhunsi, Allahabad 211 019, India
2 Department of Mathematics, Seoul National University, Shillim-dong, Gwanak-gu, Seoul 151-742, Korea, Democratic People's Republic of
     

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We give an intrinsic parametrisation of the set of tamely ramified extensions of a local field with finite residue field and bring to the fore the role played by group cohomology. We show that two natural definitions of the cohomology class of a tamely ramified finite galoisian extension coincide, and can be recovered from the parameter. We also give an elementary proof of Serre’s mass formula in the tame case and in the simplest wild case, and we classify tame galoisian extensions of degree the cube of a prime.
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  • Tame Ramification and Group Cohomology

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Authors

Chandan Singh Dalawat
Harish-Chandra Research Institute, Chhatnag Road, Jhunsi, Allahabad 211 019, India
Jung-Jo Lee
Department of Mathematics, Seoul National University, Shillim-dong, Gwanak-gu, Seoul 151-742, Korea, Democratic People's Republic of

Abstract


We give an intrinsic parametrisation of the set of tamely ramified extensions of a local field with finite residue field and bring to the fore the role played by group cohomology. We show that two natural definitions of the cohomology class of a tamely ramified finite galoisian extension coincide, and can be recovered from the parameter. We also give an elementary proof of Serre’s mass formula in the tame case and in the simplest wild case, and we classify tame galoisian extensions of degree the cube of a prime.