Calabi flow

In the mathematical fields of differential geometry and geometric analysis, the Calabi flow is a geometric flow which deforms a KÃÂ¤hler metric on a complex manifold. Precisely, given a KÃÂ¤hler manifold , the Calabi flow is given by:

,

where is a mapping from an open interval into the collection of all KÃÂ¤hler metrics on , is the scalar curvature of the individual KÃÂ¤hler metrics, and the indices correspond to arbitrary holomorphic coordinates . This is a fourth-order geometric flow, as the right-hand side of the equation involves fourth derivatives of .

The Calabi flow was introduced by Eugenio Calabi in 1982 as a suggestion for the construction of extremal KÃÂ¤hler metrics, which were also introduced in the same paper. It is the gradient flow of the '; extremal KÃÂ¤hler metrics are the critical points of the Calabi functional.

A convergence theorem for the Calabi flow was found by Piotr ChruÃÂciel in the case that 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 KÃÂ¤hler metrics. Ann. of Math. Stud. 102 (1982), pp. 259Ã¢ÂÂ290. Seminar on Differential Geometry. Princeton University Press (PUP), Princeton, N.J.

E. Calabi and X.X. Chen. The space of KÃÂ¤hler metrics. II. J. Differential Geom. 61 (2002), no. 2, 173Ã¢ÂÂ193.

X.X. Chen and W.Y. He. On the Calabi flow. Amer. J. Math. 130 (2008), no. 2, 539Ã¢ÂÂ570.

Piotr T. ChruÃÂciel. Semi-global existence and convergence of solutions of the Robinson-Trautman (2-dimensional Calabi) equation. Comm. Math. Phys. 137 (1991), no. 2, 289Ã¢ÂÂ313.