Titlebook: Basic Number Theory.; André Weil Book 19732nd edition Springer-Verlag Berlin Heidelberg 1973 Cantor.Mathematica.number theory

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https://doi.org/10.1007/978-3-658-16096-8 at .; if . is a finite place, .. is the maximal compact subring of .., and .. the maximal ideal in ... Moreover, in the latter case, we will agree once for all to denote by .. the module of the field .. and by .. a prime element of .., so that, by th. 6 of Chap. I–4, .... is a field with .. element

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,Herrschaft und moderne Subjektivit?t,inite and <0. If . and . are such spaces, we write Hom(.) for the space of homomorphisms of . into .. and let it operate on the right on .; in other words, if . is such a homo-morphism, and . ∈ ., we write . for the image of . under .. We consider Hom(.), in an obvious manner, as a vector-space over

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Andreas Ruppert,Hansj?rg Riechert ., and, for each place . of ., an algebraic closure .. of .., containing .. We write .., ... for the maximal se?parable extensions of . in ., and of .. in .., respectively. We write .., ..,. for the maximal abelian extensions of . in .., and of .. in ..,., respectively. One could easily deduce from

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Springer-Verlag Berlin Heidelberg 1973

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