论文信息 - Finite Morphisms to Projective Space and Capacity Theory

Finite Morphisms to Projective Space and Capacity Theory

We study conditions on a commutative ring R which are equivalent to the following requirement; whenever X is a projective scheme over S = Spec(R) of fiber dimension \leq d for some integer d \geq 0, there is a finite morphism from X to P^d_S over S such that the pullbacks of coordinate hyperplanes give prescribed subschemes of X provided these subschemes satisfy certain natural conditions. We use our results to define a new kind of capacity for adelic subsets of projective schemes X over global fields. This capacity can be used to generalize the converse part of the Fekete-Szeg\H{o} Theorem.

[1] Robert Rumely,et al. Existence of the sectional capacity , 2000 .

[2] Craig Huneke,et al. Commutative Algebra I , 2012 .

[3] B. Green. GEOMETRIC FAMILIES OF CONSTANT REDUCTIONS AND THE SKOLEM PROPERTY , 1998 .

[4] B. Green. On Curves over Valuation Rings and Morphisms to P1 , 1996 .

[5] Johan P. Hansen,et al. INTERSECTION THEORY , 2011 .

[6] Joseph Lipman,et al. Desingularization of two-dimensional schemes , 1978 .

[7] Ted Chinburg,et al. Capacity theory on varieties , 1991 .

[8] Clayton Petsche,et al. Isotriviality is equivalent to potential good reduction for endomorphisms of ${\mathbb P}^N$ over function fields , 2008, 0806.1364.

[9] David G. Cantor,et al. On an extension of the definition of transfinite diameter and some applications. , 1980 .

[10] R. Rumely,et al. Arithmetic capacities on ℙN , 1994 .

[11] M. Artin. Lipman’s Proof of Resolution of Singularities for Surfaces , 1986 .

[12] W. Vasconcelos. On projective modules of finite rank , 1969 .

[13] On the relation between Cantor’s capacity and the sectional capacity , 1993 .

[14] Laurent Moret-Bailly. Groupes de Picard et problèmes de Skolem. I , 1989 .

[15] A. Grothendieck,et al. Éléments de géométrie algébrique , 1960 .

[16] Robert Rumely,et al. Capacity theory on algebraic curves , 1989 .

[17] S. Lichtenbaum. Curves Over Discrete Valuation Rings , 1968 .