A Homogeneous Function Constant along the Leaves of a Foliation
Abstract
Given a smooth foliation by complex curves (locally around a point x∈C2\0\) which is "compatible" with the foliation by spheres centered at the origin, we construct a smooth real-valued function g in a neighborhood of said point, which is positive, homogeneous and constant along the leaves. A corollary we obtain from this is relevant to the problem of "bumping out" certain pseudoconvex domains in C3.
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