We examine the limiting dynamics of a class of non-autonomous stochastic Ginzburg-Landau equations driven by multiplicative noise and deterministic non-autonomous terms defined on thin domains. The existence and uniqueness of tempered pullback random attractors are established for the stochastic Ginzburg-Landau systems defined on $ (n+1) $-dimensional narrow domain. In addition, the upper semicontinuity of these attractors is obtained when a family of $ (n+1) $-dimensional thin domains collapses onto an $ n $-dimensional domain.