There are two parts in this paper. In part I, we discuss the Strichartz estimates on Schrödinger equation. First, we observe the restrictions on exponent pair (p,q) from the viewpoint of dimension. Then we also provide a rigid proof, and conclude that the so-called admissible pair coincides with the arguments of dimensional analysis. In part II, we study the semiclassical limit of the three coupled long wave-short wave interaction equations. First, we employ the Madelung transformation to discuss the hydrodynamical structures and the conservation laws. Then, we apply the modified Madelung transformation and energy estimates to justify the existence and uniqueness of the local classical solution. Finally, we prove the existence of the semiclassical limit of the solution.