1.Harmonic maps. 2.Compactification of Teichmuller space. 3.Harmonic maps of Kahler manifolds with constant negative holomorphic sectional curvature. 4.Minimal surfaces in a Kahler surface. 5.Stable minimal surfaces in Euclidean space. 6.The existence of minimal immersions of 2-spheres. 7.Manifolds with positive curvature on totally isotropic two-planes. 8.Compact Kahler manifolds of positive bisectional curvature. 9.Analytic aspects of the harmonic map problem. 10.Sobolev spaces and harmonic maps for metric space targets. 11.Moduli spaces and harmonic maps, compacts groups actions and the topology of manifolds with non-positive curvature. 12.Harmonic maps and the topology of stable hypersurfaces and manifolds with non-negative Ricci curvature. 13.Harmonic maps and superrigidity by Jurgen Jost and Shing-Thung Yau.