In mathematics, the WeilâÂÂPetersson metric is a Kähler metric on the Teichmüller space T<sub>g,n</sub> of genus g Riemann surfaces with n marked points. It was introduced by using the Petersson inner product on forms on a Riemann surface (introduced by Hans Petersson).
If a point of Teichmüller space is represented by a Riemann surface R, then the cotangent space at that point can be identified with the space of quadratic differentials at R. Since the Riemann surface has a natural hyperbolic metric, at least if it has negative Euler characteristic, one can define a Hermitian inner product on the space of quadratic differentials by integrating over the Riemann surface. This induces a Hermitian inner product on the tangent space to each point of Teichmüller space, and hence a Riemannian metric.
stated, and proved, that the WeilâÂÂPetersson metric is a Kähler metric. proved that it has negative holomorphic sectional, scalar, and Ricci curvatures. The WeilâÂÂPetersson metric is usually not complete.
The WeilâÂÂPetersson metric can be defined in a similar way for some moduli spaces of higher-dimensional varieties.