Ilya Tyomkin
Published 2011-03-16, updated 2012-01-19Version 3
In the current paper we show that the dimension of a family $V$ of irreducible reduced curves in a given ample linear system on a toric surface $S$ over an algebraically closed field is bounded from above by $-K_S.C+p_g(C)-1$, where $C$ denotes a general curve in the family. This result generalizes a famous theorem of Zariski to the case of positive characteristic. We also explore new phenomena that occur in positive characteristic: We show that the equality $\dim(V)=-K_S.C+p_g(C)-1$ does not imply the nodality of $C$ even if $C$ belongs to the smooth locus of $S$, and construct reducible Severi varieties on weighted projective planes in positive characteristic, parameterizing irreducible reduced curves of given geometric genus in a given ample linear system.
Comments: 19 pages. Several typos have been fixed, and a couple of examples and pictures have been added. To appear in JEMS
Albanese and Picard 1-Motives in Positive Characteristic
The Canonical Map and Horikawa Surfaces in Positive Characteristic
Effective Non-vanishing for Algebraic Surfaces in Positive Characteristic
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