On the classification of hermitian forms

C. T. C. Wall

doi:10.1007/bf01389747

journal article Sep 01, 1974

On the classification of hermitian forms

C. T. C. Wall

Inventiones mathematicae Vol. 23 No. 3-4 pp. 241-260 · Springer Science and Business Media LLC

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References

8

[1]

Bass, H.: AlgebraicK-theory. New York: W. A. Benjamin Inc. 1968

[2]

Bourbaki, N.: Algébre, Ch. 9 Formes sesquilinéaires et formes quadratiques. Paris: Hermann 1959

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Cassels, J.W.S., Fröhlich, A. (eds.): Algebraic number theory. New York: Academic Press 1967

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Kneser, M.: Hasse principle forH 1 of simply connected groups. pp. 159?163 in Proc. Symp. in Pure Math. IX (Algebraic groups and discontinuous subgroups). Amer. Math. Soc., 1966 10.1090/pspum/009/0220736

[5]

Kneser, M.: Galois cohomology of classical groups. Bombay: Tata Institute 1972

[6]

On the classification of Hermitian forms

C. T. C. Wall

Inventiones mathematicae 1972 10.1007/bf01389715

[7]

Wall, C.T.C.: On the classification of Hermitian forms. III. Complete semilocal rings. Inventiones math.19, 59?71 (1973) 10.1007/bf01418851

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Wall, C.T.C.: Foundations of algebraicL-theory. pp. 266?300 in AlgebraicK-theory III. Lecture Notes in Mathematics343, Berlin-Heidelberg-New York: Springer 1973 10.1007/bfb0061371

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On the classification of hermitian forms

C. T. C. Wall · 1974

Inventiones mathematicae

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Published: Sep 01, 1974
Vol/Issue: 23(3-4)
Pages: 241-260
License: View

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C. T. C. Wall

Cite This Article

C. T. C. Wall (1974). On the classification of hermitian forms. Inventiones mathematicae, 23(3-4), 241-260. https://doi.org/10.1007/bf01389747

On the classification of hermitian forms

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