Let be a connected graph with vertex set and edge set . For a subset of , the Steiner distance of is the minimum size of a connected subgraph whose vertex set contains . For an integer with , the Steiner-Wiener index is . In this paper, we introduce some transformations for trees that do not increase their Steiner -Wiener index for . Using these transformations, we get a sharp lower bound on Steiner -Wiener index for trees with given diameter, and obtain the corresponding extremal graph as well.