The canonical map of a foliated surface of general type
Abstract
Let (S,F) be a foliated surface over the complex number of general type, i.e., the Kodaira dimension Kod(F)=2. We study the geometry of the canonical map of the foliated surface (S,F), and prove several boundedness results on the canonical map , generalizing Beauville's beautiful work on the canonical maps of algebraic surfaces to foliated surfaces. As an application, we prove three Noether type inequalities for (S,F) depending on the Kodaira dimension of the surface S.
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