The space of germs of extremal K\" ahler metrics in one dimension comprises three distinct R3 components
Abstract
In the 1980s, Eugenio Calabi introduced the concept of extremal K\" ahler metrics as critical points of the L2-norm functional of scalar curvature in the space of K\" ahler metrics belonging to a fixed K\"ahler class of a compact complex manifold X. Calabi demonstrated that extremal K\" ahler metrics always degenerate into Einstein metrics on compact Riemann surfaces. We define a K\"ahler metric g on a domain of Cn as a local extremal K\"ahler metric of dimension n if it satisfies the Euler-Lagrange equation of this functional, i.e. holomorphic is the (1,0)-part of the gradient vector field of the scalar curvature of g, in the domain. Our main result establishes that the space of all germs of local extremal, non-Einstein K\"ahler metrics of dimension one comprises three components, each diffeomorphic to R3.
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