Approximating Ricci solitons and quasi-Einstein metrics on toric surfaces

Abstract

We present a general numerical method for investigating prescribed Ricci curvature problems on toric K\"ahler manifolds. This method is applied to two generalisations of Einstein metrics, namely Ricci solitons and quasi-Einstein metrics. We begin by recovering the Koiso--Cao soliton and the L\"u--Page--Pope quasi-Einstein metrics on CP2CP2 (in both cases the metrics are known explicitly). We also find numerical approximations to the Wang--Zhu soliton on CP2 2CP2 (here the metric is not known explicitly). Finally, a substantial numerical investigation of the quasi-Einstein equation on CP2 2CP2 is conducted. In this case it is an open problem as to whether such metrics exist on this manifold. We find metrics that solve the quasi-Einstein equation to the same degree of accuracy as the approximations to the Wang--Zhu soliton solve the Ricci soliton equation.