Title :
Fast Positive-Real Balanced Truncation Via Quadratic Alternating Direction Implicit Iteration
Author :
Wong, Ngai ; Balakrishnan, Venkataramanan
Author_Institution :
Univ. of Hong Kong, Hong Kong
Abstract :
Balanced truncation (BT), as applied to date in model order reduction (MOR), is known for its superior accuracy and computable error bounds. Positive-real BT (PRBT) is a particular BT procedure that preserves passivity and stability and imposes no structural constraints on the original state space. However, PRBT requires solving two algebraic Riccati equations (AREs), whose computational complexity limits its practical use in large-scale systems. This paper introduces a novel quadratic extension of the alternating direction implicit (ADI) iteration, which is called quadratic ADI (QADI), that efficiently solves an ARE. A Cholesky factor version of QADI, which is called CFQADI, exploits low-rank matrices and further accelerates PRBT.
Keywords :
Riccati equations; circuit stability; computational complexity; integrated circuit modelling; iterative methods; reduced order systems; state-space methods; Cholesky factor version; algebraic Riccati equations; computable error bounds; computational complexity; large-scale systems; low-rank matrices; model order reduction; passivity; positive-real balanced truncation; quadratic ADI; quadratic alternating direction implicit iteration; stability; state space; structural constraints; Acceleration; Binary search trees; Computational complexity; Computational modeling; Data mining; Large-scale systems; Riccati equations; Sparse matrices; Stability; State-space methods; Alternating direction implicit (ADI); Riccati equation; model order reduction (MOR); positive-real balanced truncation (PRBT);
Journal_Title :
Computer-Aided Design of Integrated Circuits and Systems, IEEE Transactions on
DOI :
10.1109/TCAD.2007.895617
