This article describes an approach in determination of equilibrium geometries and harmonic frequencies of molecules by the Ornstein-Uhlenbeck diffusion quantum Monte Carlo method based on the floating spherical Gaussians.In conjunction with a projected and renormalized hellmann-Feynman gradient and an electronic energy at variational Monte Carlo and diffusion quantum Monte Carlo,respectively,the quasi-Newton algorithm implemented with the Broyden-Fletcher-Goldfarb-Shanno updated Hessian was used to find the optimized molecular geometry.We applied this approach to N_2 and H_2O molecules.The geometry and harmonic frequencies calculated were consistent with some sophisticated ab initio calculated values within reasonable statistical uncertainty.
展开▼
