In one-dimensional quantum spin systems, the matrix product states (MPS) can be used as a trail wave function for variational numerical simulations. In this thesis, we investigate the construction of MPS which is related to the density matrix renormalization group (DMRG) and the Quantum information theory (QIT). We develop two algorithms, variational quantum Monte Carlo (QMC) simulations with stochastic optimization [1] and time-evolving block decimation (TEBD) [2, 3], in one dimensional systems. We generalize QMC with stochastic optimization to the open boundary condition and study the transverse Ising model and Heisenerg model. We also applied the infinite TEBD algorithm [4] to the infinite transverse Ising model and demonstrate that entanglement is a key ingredient in the quantum phase transition.