Surfaces branch\'ees et sol\'eno\"{i}des ε-holomorphes

We show that for every $\epsilon>0$, there exists a compact lamination by $\epsilon$-holomorphic surfaces in the complex projective plane, minimal, and that carries hyperbolic holonomy. We call $\epsilon$-holomorphic a real 2-dimensional surface $\Sigma$ in ${\bf C}P^2$ such that the angle between $T\Sigma$ and $iT\Sigma$ is uniformly bounded by $\epsilon$. When $\epsilon$ is sufficiently small, such surfaces are in particular symplectic.