Quadratic forms and sesquilinear forms in infinite dimensional spaces. Witt type theorems in spaces of denumerably infinite dimension
Colloque sur les formes quadratiques (Montpellier, 1975), Mémoires de la Société Mathématique de France, no. 48 (1976), pp. 21-33.
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     author = {Gross, Herbert},
     title = {Quadratic forms and sesquilinear forms in infinite dimensional spaces. {Witt} type theorems in spaces of denumerably infinite dimension},
     booktitle = {Colloque sur les formes quadratiques (Montpellier, 1975)},
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     number = {48},
     year = {1976},
     doi = {10.24033/msmf.198},
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}
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Gross, Herbert. Quadratic forms and sesquilinear forms in infinite dimensional spaces. Witt type theorems in spaces of denumerably infinite dimension, dans Colloque sur les formes quadratiques (Montpellier, 1975), Mémoires de la Société Mathématique de France, no. 48 (1976), pp. 21-33. doi : 10.24033/msmf.198. http://www.numdam.org/articles/10.24033/msmf.198/

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[2] G. Birkhoff, Lattice Theory, AMS Providence, Rhode Island, 1973.

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[12] S. Lang, On quasi algebraic closure, Ann. of Math. (1952) 55, 373-390. Important improvements can be found in M. Nagata : Note on a paper of Lang concerning quasi algebraic closure. Mem. Univ. Kyoto Ser. A 30 (1957) 237-241. For further developments and references see G. Terjanian : Dimension arithmétique d'un corps. Journ. of Algebra 22 (1972) 517-545 ; further G. Maxwell : A note on Artin's Diophantine Conjecture. Canad. Math. Bull. (1970) 13, 119-120. | Zbl

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