Every variety here is complex analytic, or complex algebraic if it solves anything.
Given a germ of a (possibly singular, nor necessarily irreducible) hypersurface $(H,0)\subset(\mathbb{C}^{n+1},0)$ and an irreducible curve $(C,0)\subset(H,0)$, does a surface $(S,0)$ such that $H\cap S=C$ (set-theoretically, as germs) always exist? Are there general conditions that give this (such as $C$ being complete intersection)?
I do not care much about the structure of the varieties, except for the dimension.
