We consider real analytic foliations X with complex leaves of transversal dimension one and we give the notion of transversal pseudoconvexity. This amounts to require that the transverse bundle NF to the leaves carries a metric {λj} on the the fibres such that the tangential (1,1)-form Ω={λj⁢∂¯⁢∂⁡λj-2⁢∂¯⁢λj⁢∂⁡λj} is positive. This condition is of a special interest if the foliation X is 1 complete i.e. admits a smooth exhaustion function ϕ which is strongly plusubharmonic along the leaves. In this situation we prove that there exist an open neighbourhood U of X in the complexification X~ of X and a non negative smooth function u:U→𝐑 which is plurisubharmonic in U, strongly plurisubharmonic on U∖X and such that X is the zero set of u. This result has many implications: every compact sublevel X¯c={x∈X:ϕ≤c} is a Stein compact and if S⁢(X) is the algebra of smooth CR functions on X, the restriction map S⁢(X)→S⁢(Xc) has a dense image (Theorem 4.1); a transversally pseudoconvex, 1-complete, real analytic foliation X with complex leaves of dimension n properly embeds in 𝐂2⁢n+3 by a CR map and the sheaf S=SX of germs of smooth CR functions on X is cohomologically trivial.