Calabi flow

In the mathematical fields of

Kähler metric on a complex manifold. Precisely, given a Kähler manifold

M

, the Calabi flow is given by:

{\frac {\partial g_{\alpha {\overline {\beta }}}}{\partial t}}={\frac {\partial ^{2}R^{g}}{\partial z^{\alpha }\partial {\overline {z}}^{\beta }}}

,

where $g$ is a mapping from an open interval into the collection of all Kähler metrics on $M$ , $R g$ is the scalar curvature of the individual Kähler metrics, and the indices $α, β$ correspond to arbitrary holomorphic coordinates $z α$ . This is a fourth-order geometric flow, as the right-hand side of the equation involves fourth derivatives of $g$ .

The Calabi flow was introduced by

extremal Kähler metrics, which were also introduced in the same paper. It is the gradient flow of the Calabi functional; extremal Kähler metrics are the critical points

of the Calabi functional.

A convergence theorem for the Calabi flow was found by Piotr Chruściel in the case that $M$ has complex dimension equal to one. Xiuxiong Chen and others have made a number of further studies of the flow, although as of 2020 the flow is still not well understood.

References

Eugenio Calabi. Extremal Kähler metrics.
Princeton, N.J.
E. Calabi and X.X. Chen. The space of Kähler metrics. II.
J. Differential Geom.
61 (2002), no. 2, 173–193.
X.X. Chen and W.Y. He. On the Calabi flow. Amer. J. Math. 130 (2008), no. 2, 539–570.
Piotr T. Chruściel. Semi-global existence and convergence of solutions of the Robinson-Trautman (2-dimensional Calabi) equation. Comm. Math. Phys. 137 (1991), no. 2, 289–313.