Following a suggestion made by J.-P. Demailly, for each $k\ge 1$, we endow, by an induction process, the $k$-th (anti)tautological line bundle $\mathcal{O}_{X_{k}}(1)$ of an arbitrary complex directed manifold $(X,V)$ with a natural smooth Hermitian metric. Then, we compute recursively the Chern curvature form for this metric, and we show that it depends (asymptotically---in a sense to be specified later) only on the curvature of $V$ and on the structure of the fibration $X_{k}\to X$. When $X$ is a surface and $V=T_{X}$, we give explicit formulae to write down the above curvature as a product of matrices. As an application, we obtain a new proof of the existence of global invariant jet differentials vanishing on an ample divisor, for $X$ a minimal surface of general type whose Chern classes satisfy certain inequalities, without using a strong vanishing theorem [1] of Bogomolov.