The notion of soft sets is introduced as a general mathematical tool for dealing with uncertainty. In this work, we consider the concepts of GL-soft perfect sets, GR-soft perfect sets and G� -soft perfect sets were introduced in the soft topological space (X, A, τ) with a soft G which are extensions of the concepts soft τG-closed, soft τG-dense in itself and soft τG-perfect, respectively. Also, we studied a characterization for suitable condition between the soft topology τ and the soft G utilizing GR-soft perfect sets. On a finite soft set a new generalized finite soft topology via GR-soft perfect sets, which is finer than soft topology τG is obtained.