In this thesis, we have investigated the localization-delocalization transitions (LDTs) of the instantaneous normal modes (INMs) in a simplefluid with short-ranged interactions. The modelfluid is a prototype of topologically disordered systems. Two LDTs in the INM spectrum are found, and the locations are termed as the mobility edges (MEs) with one in the positive-eigenvalue branch and the other in the negative-eigenvalue one. The MEs and the critical exponents of the two LDTs are estimated by the…finite-size scaling (FSS) for the second moments of the nearest-neighbor level-spacing (LS) distributions. Within numerical errors, the two estimated critical exponents are almost coincident with each other and close to that of the Anderson model (AM) in three dimensions. The nearest-neighbor LS distribution at each ME is examined to be in a good agreement with that of the AM at the critical disorder. We conclud that the LDTs in the Hessian matrices of topologically disordered systems exhibit the critical behaviors of orthogonal universality class. We also investigate the analysis of level-number variance (LNV) and level compressibility (LCP), which characterizes the nature of the correlation of energy levels beyond the mean LS. Furthermore, in terms of the multifractal analysis, the INM eigenvectors exhibit a multifractal nature with the same generalized fractal dimensions and the sigularity spectrum. Our results indicate that the singularity spectrum of the multifractal INMs agrees with that of the AM at the critical disorder. This good agreement provides a numerical evidence for the universality of the multifractals at the localization-delocalization transition. With the multifractal INMs, we calculate the probability den- sity funciton and the spatial correlation function of the squared vibrational amplitudes. With the multifractal INMs, the relation between the probability density function and the singularity spectrum is examined, so are the relations between the critical exponents of the spatial correlation function and the generalized fractal dimensions.