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arXiv:2404.16293v1 Announce Type: new
Abstract: Let $(\mathcal{F},S)$ be a foliated surface of general type with reduced singularities over the complex number. We establish the Noether type inequalities for $(\mathcal{F},S)$. Namely, we prove that $\mathrm{vol}(\mathcal{F}) \geq p_g(\mathcal{F})-2$, and that $\mathrm{vol}(\mathcal{F}) \geq 2p_g(\mathcal{F})-4$ if moreover the surface $S$ is also of general type. Examples show that both of the Noether type inequalities are sharp.
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