Analyzing the Wu metric on a class of eggs in Cn -- II

Abstract

We study the Wu metric for the non-convex domains of the form \[ E2m = \ z ∈ Cn : z1 2m + z2 2 + … + zn-1 2 + zn 2 <1 \, \] where 0 < m < 1/2. Explicit expressions for the Kobayashi metric and the Wu metric on such pseudo-eggs E2m are obtained. The Wu metric is then verified to be a continuous Hermitian metric on E2m which is real analytic everywhere except along the complex hypersurface Z = \ (0, z2, …, zn ) ∈ E2m \ . We also show that the holomorphic sectional curvature of the Wu metric for this non-compact family of pseudoconvex domains is bounded above in the sense of currents by a negative constant independent of m. This verifies a conjecture of S. Kobayashi and H. Wu for such E2m.