A Liouville Theorem and $C^α$-Estimate for Calabi-Yau Cones
Abstract: Let $(\mathscr{C}, \omega_{\mathscr{C}})$ be a Ricci-flat, simply connected, conical K\"ahler manifold. We establish a Liouville theorem for constant scalar curvature K\"ahler (cscK) metrics on $\mathscr{C}$. The theorem asserts that any cscK metric $\omega$ satisfying the uniform bound $\frac{1}{C} \omega_{\mathscr{C}} \leq \omega \leq C \omega_{\mathscr{C}}$ for some $C\geq1$ is equal to $\omega_{\mathscr{C}}$ up to a holomorphic automorphism that commutes with the scaling action of the cone structure. Next, we develop a $C{0,\alpha}$-estimate for uniformly bounded K\"ahler metrics on a ball around the apex, using a H\"older-type seminorm inspired by Krylov. This estimate applies for small $\alpha > 0$ under the assumption of uniformly bounded scalar curvature. As a corollary of this result, we show that such a K\"ahler metric $\omega$ is asymptotic to the Ricci-flat cone metric $\omega_{\mathscr{C}}$, with polynomial decay rate $r\alpha$ and for sufficiently small $\alpha > 0$.
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