We prove that if φ is a homogeneous harmonic map from a Riemann surface M into a complex Grassmann manifold G(k, n), then the maps of the harmonic sequences generated by φ are all homogeneous.
We show that any harmonic sequence determined by a harmonic map from a compact Riemannian surface M to CP^n has a terminating holomorphic (or anti-holomorphic) map from M to CP^n, or a "bubble tree limit" consisti...We show that any harmonic sequence determined by a harmonic map from a compact Riemannian surface M to CP^n has a terminating holomorphic (or anti-holomorphic) map from M to CP^n, or a "bubble tree limit" consisting of a harmonic map f: M → CP^n and a tree of bubbles hλ^μ: S^2 --→ CP^n.展开更多
基金This work was supported in part by the National Natural Science Foundation of China (Grant No. 11401481) and the Research Development Fund of XJTLU (Grant No. RDF13-01-14).
文摘We prove that if φ is a homogeneous harmonic map from a Riemann surface M into a complex Grassmann manifold G(k, n), then the maps of the harmonic sequences generated by φ are all homogeneous.
基金Supported by National Natural Science Foundation of China (Grant No. 10771004)
文摘We show that any harmonic sequence determined by a harmonic map from a compact Riemannian surface M to CP^n has a terminating holomorphic (or anti-holomorphic) map from M to CP^n, or a "bubble tree limit" consisting of a harmonic map f: M → CP^n and a tree of bubbles hλ^μ: S^2 --→ CP^n.
