交通部運輸研究所Institute of Transportation, MOTC

　　The models involved usually exhibit a user equilibrium constraint to form a difficult nonlinear, nonconvex optimization problem. Due to the computational difficulties, a nonlinear approximation of the reaction function is incorporated for solving the problem more efficiently. This research tries to establish the theory of higher-order sensitivity analysis of network equilibrium flows in order to solve the problem with a nonlinear approximation of the reaction function.

　　This research is also going to extend the applicability of directional derivative-based sensitivity analysis method. To generalize the directional derivative-based sensitivity analysis, the continuous differentiability assumption on the cost function is relaxed to be piecewise linear functions. Building on the original directional derivative-based method, an extended model will be studied for providing the required sensitivity information using piecewise linear cost functions.