In terms of the almost complex connection and the unitary moving frame, a complex version on the theory of the nearly Khler structure in S^(6) is given. Under this framework, minimal surfaces in the nearly Khler...In terms of the almost complex connection and the unitary moving frame, a complex version on the theory of the nearly Khler structure in S^(6) is given. Under this framework, minimal surfaces in the nearly Khler S^(6) are studied. A complete classification for c omplete minimal surfaces in S^(6) with constant Khler angle and nonnegative curvature is given. Moreover, almost complex curves in S^(6) are considered.展开更多
文摘In terms of the almost complex connection and the unitary moving frame, a complex version on the theory of the nearly Khler structure in S^(6) is given. Under this framework, minimal surfaces in the nearly Khler S^(6) are studied. A complete classification for c omplete minimal surfaces in S^(6) with constant Khler angle and nonnegative curvature is given. Moreover, almost complex curves in S^(6) are considered.
