B-complex manifolds with generalized corners. I. Newlander-Nirenberg Theorems

Abstract

We generalize complex manifolds to manifolds with corners X, and to manifolds with generalized corners (g-corners) in the sense of the second author arXiv:1501.00401, using complex structures on the b-tangent bundle (log tangent bundle) bTX. We prove a formal Newlander-Nirenberg type theorem showing that along each corner stratum of X, the b-complex structure agrees with a standard model to infinite order. In the sequel we show that if S is a log smooth log C-scheme, or log smooth log complex analytic space, then the Kato-Nakayama space S KN has the structure of a b-complex manifold with g-corners. Using our Newlander-Nirenberg theorem we give necessary and sufficient conditions for a b-complex manifold with g-corners to be a Kato-Nakayama space.