Matsusaka's big theorem
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In algebraic geometry, given an ample line bundle L on a compact complex manifold X, Matsusaka's big theorem gives an integer m, depending only on the Hilbert polynomial of L, such that the tensor power Ln is very ample for n ≥ m. The theorem was proved by Teruhisa Matsusaka in 1972 and named by Lieberman and Mumford in 1975.[1][2][3]
The theorem has an application to the theory of Hilbert schemes.
Notes
- ↑ Matsusaka, T. (1972). "Polarized Varieties with a Given Hilbert Polynomial". American Journal of Mathematics 94 (4): 1027–1077. doi:10.2307/2373563.
- ↑ Lieberman, D.; Mumford, D. (1975). "Matsusaka's big theorem". Algebraic Geometry. Providence, RI: American Mathematical Society. pp. 513–530.
- ↑ Kollár, János (August 2006). "Teruhisa Matsusaka (1926–2006)". Notices of the American Mathematical Society 53 (7): 766–768. https://www.ams.org/notices/200607/comm-kollar.pdf.
Original source: https://en.wikipedia.org/wiki/Matsusaka's big theorem.
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