New Approach to the Stability of Chemical Reaction Networks: Piecewise Linear in Rates Lyapunov Functions
From MaRDI portal
Publication:2980702
DOI10.1109/TAC.2015.2427691zbMath1359.93440arXiv1407.0662MaRDI QIDQ2980702
Muhammad Ali al-Radhawi, David Angeli
Publication date: 3 May 2017
Published in: IEEE Transactions on Automatic Control (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1407.0662
Related Items (19)
Structural analysis in biology: a control-theoretic approach ⋮ An all-encompassing global convergence result for processive multisite phosphorylation systems ⋮ Polyhedral Lyapunov functions structurally ensure global asymptotic stability of dynamical networks iff the Jacobian is non-singular ⋮ Vertex results for the robust analysis of uncertain biochemical systems ⋮ Graphical characterizations of robust stability in biological interaction networks ⋮ The Yakubovich S-Lemma Revisited: Stability and Contractivity in Non-Euclidean Norms ⋮ Sufficient Conditions for Linear Stability of Complex-Balanced Equilibria in Generalized Mass-Action Systems ⋮ Stability analysis for Butlerov chemical reaction in batch reactor ⋮ Qualitative analysis of an ODE model of a class of enzymatic reactions. Some results on global stability of messenger RNA-microRNA interaction ⋮ Complex Balancing Reconstructed to the Asymptotic Stability of Mass-Action Chemical Reaction Networks with Conservation Laws ⋮ Global stability of a class of futile cycles ⋮ Complex-balanced equilibria of generalized mass-action systems: necessary conditions for linear stability ⋮ The deficiency zero theorem and global asymptotic stability for a class of chemical reaction networks with arbitrary time delays ⋮ On convergence for hybrid models of gene regulatory networks under polytopic uncertainties: a Lyapunov approach ⋮ A Graphic Formulation of Nonisothermal Chemical Reaction Systems and the Analysis of Detailed Balanced Networks ⋮ Lyapunov Function Partial Differential Equations for Chemical Reaction Networks: Some Special Cases ⋮ Chemical reaction network decomposition technique for stability analysis ⋮ Symbolic Proof of Bistability in Reaction Networks ⋮ Michaelis-Menten networks are structurally stable
This page was built for publication: New Approach to the Stability of Chemical Reaction Networks: Piecewise Linear in Rates Lyapunov Functions
