A complex manifold can be viewed as a smooth manifold. A smooth manifold together with an integrable almost complex structure can be given a complex structure.
Clearly a complex analytic space can be viewed as a real analytic space. My question is now, does there exist a concept on real analytic spaces similar to an almost complex structure on a smooth manifold. And does the "integrability" of such a structure imply that there exists a complex structure on this space such that the associated real analytic space is equal or at least isomorphic to the real analytic space one started with.