The Newlander-Nirenberg theorem for complex $b$-manifolds

Abstract: Melrose defined the $b$-tangent bundle of a smooth manifold $M$ with boundary as the vector bundle whose sections are vector fields on $M$ tangent to the boundary. Mendoza defined a complex $b$-manifold as a manifold with boundary together with an involutive splitting of the complexified $b$-tangent bundle into complex conjugate factors. In this article, we prove complex $b$-manifolds have a single local model depending only on dimension. This can be thought of as the Newlander-Nirenberg theorem for complex $b$-manifolds: there are no local invariants''. Our proof uses Mendoza's existing result that complex $b$-manifolds do not haveformal local invariants'' and a singular coordinate change trick to leverage the classical Newlander-Nirenberg theorem.