Nodal surface

In algebraic geometry, a nodal surface is a surface in (usually complex) projective space whose only singularities are nodes. A major problem about them is to find the maximum number of nodes of a nodal surface of given degree.

The following table gives some known upper and lower bounds for the maximal number of nodes on a complex surface of given degree. In degree 7, 9, 11, and 13, the upper bound is given by Varchenko (1983), which is better than the one by Miyaoka (1984).

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Degree	Lower bound	Surface achieving lower bound	Upper bound
1	0	Plane	0
2	1	Conical surface	1
3	4	Cayley's nodal cubic surface	4
4	16	Kummer surface	16
5	31	Togliatti surface	31 (Beauville)
6	65	Barth sextic	65 (Jaffe and Ruberman)
7	99	Labs septic	104
8	168	Endraß surface	174
9	226	Labs	246
10	345	Barth decic	360
11	425	Chmutov	480
12	600	Sarti surface	645
13	732	Chmutov	829
d			${\tfrac {4}{9}}d(d-1)^{2}$ (Miyaoka 1984)
d ≡ 0 (mod 3)	${\tbinom {d}{2}}\lfloor {\tfrac {d}{2}}\rfloor +({\tfrac {d^{2}}{3}}-d+1)\lfloor {\tfrac {d-1}{2}}\rfloor$	Escudero
d ≡ ±1 (mod 6)	$(5d^{3}-14d^{2}+13d-4)/12$	Chmutov
d ≡ ±2 (mod 6)	$(5d^{3}-13d^{2}+16d-8)/12$	Chmutov

Varchenko, A. N. (1983), "Semicontinuity of the spectrum and an upper bound for the number of singular points of the projective hypersurface", Doklady Akademii Nauk SSSR, 270 (6): 1294–1297, MR 0712934
Miyaoka, Yoichi (1984), "The maximal Number of Quotient Singularities on Surfaces with Given Numerical Invariants", Mathematische Annalen, 268 (2): 159–171, doi:10.1007/bf01456083, MR 0744605
Chmutov, S. V. (1992), "Examples of projective surfaces with many singularities.", J. Algebraic Geom., 1 (2): 191–196, MR 1144435
Escudero, Juan García (2013), "On a family of complex algebraic surfaces of degree 3n", C. R. Math. Acad. Sci. Paris, 351 (17–18): 699–702, arXiv:1302.6747, doi:10.1016/j.crma.2013.09.009, MR 3124329

See also

References

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