论文信息 - Complex Analytic Coordinates in Almost Complex Manifolds

Complex Analytic Coordinates in Almost Complex Manifolds

A manifold is called a complex manifold if it can be covered by coordinate patches with complex coordinates in which the coordinates in overlapping patches are related by complex analytic transformations. On such a manifold scalar multiplication by i in the tangent space has an invariant meaning. An even dimensional 2n real manifold is called almost complex if there is a linear transformation J defined on the tangent space at every point (and varying differentiably with respect to local coordinates) whose square is minus the identity, i.e. if there is a real tensor field h' satisfying

Louis Nirenberg | L. Nirenberg | A. Newlander | A. Newlander

[1] David Hilbert,et al. Zur Theorie der konformen Abbildung , 1935 .

[2] A. Frölicher. Zur Differentialgeometrie der komplexen Strukturen , 1955 .

[3] Shiing-Shen Chern,et al. An elementary proof of the existence of isothermal parameters on a surface , 1955 .

[4] Louis Nirenberg,et al. Interior estimates for elliptic systems of partial differential equations , 1955 .

[5] George S. Springer,et al. Introduction to Riemann Surfaces , 1959 .

[6] A. Lichnerowicz. Theorie globale des connexions et des groupes d'holonomie , 1955 .