On isometric minimal immersion of a singular non-CSC extremal Kahler metric into 3-dimensional space forms

Abstract

On any compact Riemann surface there always exists a singular non-CSC (constant scalar curvature) extremal Kahler metric which is called a non-CSC HCMU (the Hessian of the Curvature of the Metric is Umbilical) metric. In this paper, by moving frames, we show that any non-CSC HCMU metric can not be isometrically minimal immersed into 3-dimensional real space forms even locally. In general, any non-CSC HCMU metric can not be isometrically immersed into 3-dimensional real space forms with constant mean curvature (CMC).

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