Title :
A Numerical Solver Design for Extended-Term Time-Domain Simulation
Author :
Chuan Fu ; McCalley, James D. ; Jianzhong Tong
Author_Institution :
Electr. & Comput. Eng. Dept., Iowa State Univ., Ames, IA, USA
Abstract :
Numerical methods play an important role in improving efficiency for power system time-domain simulation. Motivated by the need to perform high-speed extended-term time-domain simulation (HSET-TDS) for online purposes, this paper presents design principles for numerical solvers of differential algebraic systems associated with power system time-domain simulation, focusing on DAE construction strategies, integration methods, nonlinear solvers, and linear solvers. We have implemented a design appropriate for HSET-TDS, and we have compared the proposed integration method, Hammer-Hollingsworth 4 (HH4), with Trapezoidal rule in terms of computational efficiency and accuracy, using the New England 39-bus system, an expanded 8775-bus system, and PJM 13 029-bus system.
Keywords :
differential algebraic equations; power system simulation; time-domain analysis; DAE construction strategy; HSET-TDS; Hammer-Hollingsworth 4 integration method; New England 39-bus system; PJM 13 029-bus system; differential algebraic systems; expanded 8775-bus system; high-speed extended-term time-domain simulation; integration methods; linear solvers; nonlinear solvers; numerical methods; numerical solver design; power system time-domain simulation; trapezoidal rule; Computational modeling; Jacobian matrices; Mathematical model; Numerical models; Power system dynamics; Time domain analysis; Cascading; Hammer-Hollingsworth 4 (HH4); extended-term; integration; numerical methods; power system dynamics; time-domain simulation;
Journal_Title :
Power Systems, IEEE Transactions on
DOI :
10.1109/TPWRS.2011.2177674
