Rotationally Symmetric Extremal K\"ahler Metrics on Cn and C2 \0\

Abstract

In this paper, we study rotationally symmetric extremal K\"ahler metrics on Cn (n≥ 2) and C2 \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 Cn with positive bisectional curvature, and we give a smooth extension lemma for U(n) invariant extremal K\"ahler metrics on Cn\0\. We retrieve known examples of smooth or singular extremal K\"ahler metrics on Hirzebruch surfaces, bundles over CP1, and weighted complex projective spaces. We also show that certain solutions on C2\0\ correspond to new complete families of constant-scalar-curvature K\"ahler and strictly extremal K\"ahler metrics on complex line bundles over CP1 and on C2\0\.