Heinrich Massold
Published 2006-11-23, updated 2016-01-26Version 3
For two properly intersecting effective cycles in projective space X,Y, and their intersection product Z, the metric Bezout Theorem relates the degrees, heights of X,Y, and Z, as well as their distances and algebraic distances to a given point theta. Applications of this Theorem are in the area of Diophantine Approximation, giving estimates for approximation properties of Z with respect to $\theta$ against the ones of X, and Y.
Comments: 53 pages, One major error (proof of old Proposition 4.16.3) corrected, Calculus slightly simplified
Diophantine approximation on manifolds and lower bounds for Hausdorff dimension
Diophantine approximation on polynomial curves
Rational points near planar curves and Diophantine approximation
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