Mass, Kaehler Manifolds, and Symplectic Geometry
arXiv:1810.11417
Abstract
In the author's previous joint work with Hans-Joachim Hein, a mass formula for asymptotically locally Euclidean (ALE) Kaehler manifolds was proved, assuming only relatively weak fall-off conditions on the metric. However, the case of real dimension 4 presented technical difficulties that led us to require fall-off conditions in this special dimension that are stronger than the Chrusciel fall-off conditions that sufficed in higher dimensions. The present article, however, shows that techniques of $4$-dimensional symplectic geometry can be used to obtain all the major results of the previous paper, assuming only Chrusciel-type fall-off. In particular, the present article presents a new a proof of our Penrose-type inequality for the mass of an asymptotically Euclidean Kaehler manifold that only requires Chrusciel metric fall-off.
25 pages, 5 figures, LaTeX2e