Limit points of one-parameter subgroups for additive actions on hypersurfaces
Abstract: By an additive action on an algebraic variety $X$ over $\mathbb{C}$, we mean an action of the group $\mathbb{G}an = \mathbb{C}n $ on $X$ with an open orbit. We study limit points of one-dimensional subgroups of $\mathbb{G}_an$ for additive actions on projective hypersurfaces. We say that an additive action on $X$ satisfies the OP-condition if for every point $x\in X $ that does not lie in the open orbit $O$ there is a point $y \in O$ and a vector $v \in \mathbb{G}_an$ such that $ \lim{t\to\infty} tv\circ y = x$. We find all projective hypersurfaces on which there is an additive action satisfying the OP-condition.
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