Rotationally Symmetric Extremal Kähler Metrics on $\mathbb C^n$ and $\mathbb C^2\setminus \{0\}$

Abstract: In this paper, we study rotationally symmetric extremal K\"ahler metrics on $\mathbb C^n$ ($n\geq 2$) and $\mathbb C^2 \backslash{0}$. We present a classification of such metrics based on the zeros of the polynomial appearing in Calabi's Extremal Equation. As applications, we prove that there are no $U(n)$ invariant complete extremal K\"ahler metrics on $\mathbb C^n$ with positive bisectional curvature, and we give a smooth extension lemma for $U(n)$ invariant extremal K\"ahler metrics on $\mathbb{C}^n\backslash{0}$. We retrieve known examples of smooth or singular extremal K\"ahler metrics on Hirzebruch surfaces, bundles over $\mathbb{CP}^1$, and weighted complex projective spaces. We also show that certain solutions on $\mathbb C^2\backslash{0}$ correspond to new complete families of constant-scalar-curvature K\"ahler and strictly extremal K\"ahler metrics on complex line bundles over $\mathbb{CP}^{1}$ and on $\mathbb C^2\backslash{0}$.