We study several families of vertex operator superalgebras from a jet (super)scheme point of view. We provide new examples of vertex algebras which are “chiral-quantizations" of their \(C_{2}\)-algebras \(R_V\). Our examples come from affine \(C_\ell ^{(1)}\)-series vertex algebras, \(\ell \geqslant 1\), certain \(N=1\) superconformal vertex algebras, Feigin–Stoyanovsky principal subspaces, Feigin–Stoyanovsky type subspaces, graph vertex algebras \(W_{\Gamma }\), and extended Virasoro vertex algebras. We also give a counterexample to the chiral-quantization property for the \(N=2\) superconformal vertex algebra with central charge 1.