Let $𝒴$ be a smooth oriented Riemannian manifold which is compact, connected, without boundary and with second homology group without torsion. In this paper we characterize the sequential weak closure of smooth graphs in $B^n\times 𝒴$ with equibounded Dirichlet energies, $B^n$ being the unit ball in ${ℝ}^n$. More precisely, weak limits of graphs of smooth maps $u_k:B^n\to 𝒴$ with equibounded Dirichlet integral give rise to elements of the space ${cart}^{2,1}(B^n\times 𝒴)$ (cf. [4], [5], [6]). In this paper we prove that every element $T$ in ${cart}^{2,1}(B^n\times 𝒴)$ is the weak limit...