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References
H. Bass, K2 of global fields, AMS Taped Lecture, (Cambridge, Mass., Oct. 1969).
H. Bass, K2 des corps globaux (d'apres Tate, Garland, ...) Sem. Bourbaki no 394, (juin 1971).
J. Coates, On K2 and some classical conjectures in algebraic number theory, Ann. of Math., 95(1972), 99–116.
K. Dennis, K2 and the stable range condition (preprint).
H. Garland, A finiteness theorem for K2 of a number field, Ann. Math.
S. Lang, Algebraic number theory, Addison Wesley, (1970).
S. Lichtenbaum, On the valuesof zeta and L-functions I, (to appear in Ann. of Math.)
J. Milnor, Algebraic K-theory and quadratic forms, Inventiones Math. (1970) 318–344.
J. Milnor, Introduction to algebraic K-theory, Ann. Math. Studies, Princeton (1971).
C. Moore, Group extensions of p-adic and adelic linear groups, Publ. I.H.E.S. 35 (1969) 5–74.
J. P. Serre, Groupes algébriques et corps de classes, Hermann (1959).
T. A. Springer, A remark on the Milnor ring (preprint) Utrecht
J. Tate, K2 of global fields, AMS Taped Lecture (Cambridge, Mass., Oct., 1969).
J. Tate, Symbols in arithmetic (hour address) Proc. Internat. Cong. Math., Nice (1970).
A. Weil, Basic number theory, Springer-Verlag (1967).
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Bass, H., Tate, J. (1973). The Milnor ring of a global field. In: Bass, H. (eds) “Classical” Algebraic K-Theory, and Connections with Arithmetic. Lecture Notes in Mathematics, vol 342. Springer, Berlin, Heidelberg. https://doi.org/10.1007/BFb0073733
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DOI: https://doi.org/10.1007/BFb0073733
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