Liouville's equation: Difference between revisions

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<center><math>\triangle u=\Lambda\exp(u)</math></center>
<center><math>\triangle u=\Lambda\exp(u)</math></center>


after having set <math>u=3\phi</math> and <math>\Lambda</math> being a constant. We have used the fact that in dimension two, a set of isothermal coordinates always exists such that the Riemannian metric takes the simple form <math>g=\exp(\phi)g_0</math> being <math>g_0</math> the usual Euclidean metric. The equation for the Ricci soliton can be turned back to the original Liouville equation by a <math>\frac{\pi}{2}</math> rotation of one of the coordinates in the complex plane.
after having set <math>u=2\phi</math> and <math>\Lambda</math> being a constant. We have used the fact that in dimension two, a set of isothermal coordinates always exists such that the Riemannian metric takes the simple form <math>g=\exp(\phi)g_0</math> being <math>g_0</math> the usual Euclidean metric. The equation for the Ricci soliton can be turned back to the original Liouville equation by a <math>\frac{\pi}{2}</math> rotation of one of the coordinates in the complex plane.


== See also ==
== See also ==

Revision as of 10:15, 27 January 2009

Liouville's equation

in first arose in the problem of prescribing scalar curvature on a surface. It can be explicitly solved as

as was first observed by Liouville.

It is a limiting case of the sinh-gordon equation.

Standard energy methods give GWP in H^1.

Liouville equation turns out to be an equation for a Ricci soliton in . This can be seen by noticing that the Ricci flow in this case take the very simple form

Then, a Ricci soliton is given by

after having set and being a constant. We have used the fact that in dimension two, a set of isothermal coordinates always exists such that the Riemannian metric takes the simple form being the usual Euclidean metric. The equation for the Ricci soliton can be turned back to the original Liouville equation by a rotation of one of the coordinates in the complex plane.

See also

References

  1. J. Liouville, Sur l'equation aux differences partielles , J. Math. Pure Appl. 18(1853), 71--74.