Using the canonical transformation and the method of path integrals, the quantum wavefunction of the time-dependent RLC circuit after quantization is solved, and the quantum fluctuations of the charge and current are investigated.

The mathematical structure and physical sense of Feynman s path integrals have been redefined,by using the theory of stochastic processes.

Using the canonical transformation and the method of path integrals,the exact wavefunction of the time dependent damped harmonic oscillator is derived.

Solution of a particle s motion in a one-dimensional infinite square potential well using path integral;

Introduction of Feynman s path integral theory into engineering physics;

A real time path integral approach is developed in order to work out a correct solution to a problem for the smaller result of the fusion probability of heavy nuclei based on the classical diffusion model at sub-barrier energies.

Solutions of path integration for nonlinear dynamical system under stochastic parametric and external excitations;

The main purpose of this paper is to extend the numerical path integration based on Gauss-Legendre formula and study its applications in complex nonlinear stochastic dynamical systems.

The probability density function of the model can be captured by using path integration.

It is shown that the calculative results by selecting the different integral paths of bypassing the limit points are the same,the two kinds of calculative methods aren t of equal value,the calculative method of removing the limit points is the right and feasible method to calculate the Green s function,but the calculative method of bypassing the limit points should not b.