Finiteness results for algebraic K3 surfaces

Hans Sterk

doi:10.1007/bf01168156

journal article Dec 01, 1985

Finiteness results for algebraic K3 surfaces

Hans Sterk

Mathematische Zeitschrift Vol. 189 No. 4 pp. 507-513 · Springer Science and Business Media LLC

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References

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Ash, A., Mumford, D., Rapoport, M., Tai, Y.: Smooth compactification of locally symmetric varieties, Lie groups: history frontiers and applications volume IV. Brookline Massachusetts: Math. Sci. Press 1975

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Barth, W., Peters, C., Van de Ven, A.: Compact Complex Surfaces. Berlin Heidelberg New York Tokyo: Springer 1984 10.1007/978-3-642-96754-2

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Bourbaki, N.: Groupes et Algébres de Lie, Ch. 4, 5 et 6. Paris: Masson 1981

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Borel, A., Harish-Chandra: Arithmetic subgroups of algebraic groups. Ann. Math.75, 485?535 (1962). 10.2307/1970210

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Bremner, A.: A geometric approach to equal sums of sixth powers. Proc. Lond. Math. Soc.43, 544?581 (1981) 10.1112/plms/s3-43.3.544

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Marcus, D.A.: Number Fields. Berlin Heidelberg New York: Springer 1977 10.1007/978-1-4684-9356-6

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Piateckii-Shapiro, I., Shafarevic, I.R.: A torelli theorem for algebraic surfaces of type K-3. Isv. Akad. Nauk35, 530?572 (1971)

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The two most algebraic K3 surfaces

�. B. Vinberg

Mathematische Annalen 1983 10.1007/bf01456933

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Details

Published: Dec 01, 1985
Vol/Issue: 189(4)
Pages: 507-513
License: View

Authors

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Hans Sterk

Cite This Article

Hans Sterk (1985). Finiteness results for algebraic K3 surfaces. Mathematische Zeitschrift, 189(4), 507-513. https://doi.org/10.1007/bf01168156

Finiteness results for algebraic K3 surfaces

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