Reza Mahboobi Esfanjani scite author profile

Please cite this article as: A. Farnam, R. Mahboobi Esfanjani, Improved linear matrix inequality approach to stability analysis of linear systems with interval time-varying delays, Journal of Computational and Applied Mathematics (2015), http://dx.Abstract -This paper investigates the problem of stability analysis for a class of linear systems with interval time-varying delay. In order to develop a less conservative stability condition, a LyapunovKrasovskii functional comprising novel integral terms is introduced. Convex combination idea is utilized to derive a stability criterion in terms of linear matrix inequalities (LMIs) without any additional freeweighting matrices which decreases drastically the computational burden of the stability test. Numerical examples are presented to illustrate the superiority of the proposed approach compared to some existing ones in the literature.

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Distributed predictive formation control of networked mobile robots subject to communication delay

Yamchi

Esfanjani

2017

Robotics and Autonomous Systems

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Model predictive control of constrained non-linear time-delay systems

Reble

Esfanjani

Nikravesh

et al. 2010

IMA Journal of Mathematical Control and Information

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This paper proposes a model predictive control scheme for non-linear time-delay systems with input constraints. Based on the results for systems without delays, asymptotic stability of the closed loop is guaranteed by utilizing an appropriate terminal cost functional and an appropriate terminal region such that the optimal cost for the finite-horizon problem is an upper bound on the optimal cost for the associated infinite-horizon problem. Two structured procedures are presented to determine offline the terminal cost and the terminal region for a class of non-linear time-delay systems. For both procedures, sufficient conditions can be formulated in terms of linear matrix inequalities based on the Jacobi linearization of the system about the origin. The first procedure uses a combination of Lyapunov-Krasovskii and Lyapunov-Razumikhin conditions in order to compute a locally stabilizing controller and a control invariant region. The second procedure only applies Lyapunov-Krasovskii arguments but may yield more complicated control invariant regions. The effectiveness of both schemes is compared for the example of a continuous stirred tank reactor with recycle stream.

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