A theory is developed for local, first-order sensitivity analysis of limit-cycle oscillating hybrid systems, which are dynamical systems exhibiting both continuous-state and discrete-state dynamics whose state trajectories are closed, isolated, and time-periodic. Methods for the computation of initial-condition sensitivities and parametric sensitivities are developed to account exactly for any jumps in the sensitivities at discrete transitions and to exploit the time-periodicity of the system. It is shown that the initial-condition sensitivities of any limit-cycle oscillating hybrid system can be represented as the sum of a time-decaying component and a time-periodic component so that they become periodic in the long-time limit. A method is...
In this paper, we introduce the notion of transfer function for linear hybrid systems in the presenc...
Abstract Phase reduction theory for stable limit-cycle solutions of one-dimensional reaction-diffusi...
Electronic full text of this thesis published publications are unavailable. See print copy in SpArk ...
Boundary value formulations are presented for exact and efficient sensitivity analysis, with respect...
Thesis (S.M.)--Massachusetts Institute of Technology, Computation for Design and Optimization Progra...
Oscillation is one of the most important nonlinear behaviors which is widely observed in living cell...
The work presented in this thesis consists of two major parts. In Chapter 2, the theory of sensitivi...
Sensitivity analysis is a powerful tool in investigating the impact of parameter variations on the c...
There has been a growing body of experimental and computational evidence of oscillations in biologic...
Hybrid systems are those that inherently combine discrete and continuous dynamics. This paper consid...
This paper addresses the sensitivity analysis for hybrid systems with discontinuous (jumping) state ...
AbstractPhase reduction theory for stable limit-cycle solutions of one-dimensional reaction-diffusio...
Sensitivity analysis for hybrid systems with state-triggered jumps is experiencing renewed attention...
The development of trajectory sensitivity analysis for hybrid systems, such as power systems, is pre...
Abstract — Few tools exist for identifying the dynamics of rhythmic systems from input–output data. ...
In this paper, we introduce the notion of transfer function for linear hybrid systems in the presenc...
Abstract Phase reduction theory for stable limit-cycle solutions of one-dimensional reaction-diffusi...
Electronic full text of this thesis published publications are unavailable. See print copy in SpArk ...
Boundary value formulations are presented for exact and efficient sensitivity analysis, with respect...
Thesis (S.M.)--Massachusetts Institute of Technology, Computation for Design and Optimization Progra...
Oscillation is one of the most important nonlinear behaviors which is widely observed in living cell...
The work presented in this thesis consists of two major parts. In Chapter 2, the theory of sensitivi...
Sensitivity analysis is a powerful tool in investigating the impact of parameter variations on the c...
There has been a growing body of experimental and computational evidence of oscillations in biologic...
Hybrid systems are those that inherently combine discrete and continuous dynamics. This paper consid...
This paper addresses the sensitivity analysis for hybrid systems with discontinuous (jumping) state ...
AbstractPhase reduction theory for stable limit-cycle solutions of one-dimensional reaction-diffusio...
Sensitivity analysis for hybrid systems with state-triggered jumps is experiencing renewed attention...
The development of trajectory sensitivity analysis for hybrid systems, such as power systems, is pre...
Abstract — Few tools exist for identifying the dynamics of rhythmic systems from input–output data. ...
In this paper, we introduce the notion of transfer function for linear hybrid systems in the presenc...
Abstract Phase reduction theory for stable limit-cycle solutions of one-dimensional reaction-diffusi...
Electronic full text of this thesis published publications are unavailable. See print copy in SpArk ...