Nagata–Biran conjecture
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In mathematics, the Nagata–Biran conjecture, named after Masayoshi Nagata and Paul Biran, is a generalisation of Nagata's conjecture on curves to arbitrary polarised surfaces.
Statement
Let X be a smooth algebraic surface and L be an ample line bundle on X of degree d. The Nagata–Biran conjecture states that for sufficiently large r the Seshadri constant satisfies
- [math]\displaystyle{ \varepsilon(p_1,\ldots,p_r;X,L) = {d \over \sqrt{r}}. }[/math]
References
- Biran, Paul (1999), "A stability property of symplectic packing", Inventiones Mathematicae 1 (1): 123–135, doi:10.1007/s002220050306, Bibcode: 1999InMat.136..123B.
- Syzdek, Wioletta (2007), "Submaximal Riemann-Roch expected curves and symplectic packing", Annales Academiae Paedagogicae Cracoviensis 6: 101–122, http://studmath.up.krakow.pl/index.php/studmath/article/viewFile/48/41. See in particular page 3 of the pdf.
Original source: https://en.wikipedia.org/wiki/Nagata–Biran conjecture.
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