Zariski surface

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In algebraic geometry, a branch of mathematics, a Zariski surface is a surface over a field of characteristic p > 0 such that there is a dominant inseparable map of degree p from the projective plane to the surface. In particular, all Zariski surfaces are unirational. They were named after Oscar Zariski who used them in 1958 to give examples of unirational surfaces in characteristic p > 0 that are not rational. (In characteristic 0 by contrast, Castelnuovo's theorem implies that all unirational surfaces are rational.)

Zariski surfaces are birational to surfaces in affine 3-space A³ defined by irreducible polynomials of the form

$z^{p}=f(x,y).\$

The following problem posed by Oscar Zariski in 1971 is still open: let p ≥ 5, let S be a Zariski surface with vanishing geometric genus. Is S necessarily a rational surface? For p = 2 and for p = 3 the answer to the above problem is negative as shown in 1977 by Piotr Blass in his University of Michigan Ph.D. thesis and by William E. Lang in his Harvard Ph.D. thesis in 1978.

References

Blass, Piotr; Lang, Jeffrey (1987), Zariski surfaces and differential equations in characteristic p>0, Monographs and Textbooks in Pure and Applied Mathematics 106, New York: Marcel Dekker Inc., ISBN 978-0-8247-7637-4, MR 879599
Zariski, Oscar (1958), "On Castelnuovo's criterion of rationality p_a=P₂=0 of an algebraic surface", Illinois Journal of Mathematics 2: 303–315, ISSN 0019-2082, MR 0099990

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Zariski surface

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References