Alvaro Liendo
Published 2009-11-05Version 1
Let X be a normal affine T-variety, where T stands for the algebraic torus. We classify Ga-actions on X arising from homogeneous locally nilpotent derivations of fiber type. We deduce that any variety with trivial Makar-Limanov (ML) invariant is birationally decomposable as Y\times P^2, for some Y. Conversely, given a variety Y, there exists an affine variety X with trivial ML invariant birational to Y\times P^2. Finally, we introduce a new version of the ML invariant, called the FML invariant. According to our conjecture, the triviality of the FML invariant implies rationality. This conjecture holds in dimension at most 3.
Journal: Journal of Algebra 324 (2010), pp. 3653-3665
Rational Contractions of Fiber Type on $\overline{M}_{0,6}$
Models of affine curves and Ga-actions
Ga-actions on affine cones
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