Analysis of mass-action systems by split network translation
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Publication:2072227
DOI10.1007/s10910-021-01299-3zbMath1481.92191arXiv2104.03454OpenAlexW3216540893MaRDI QIDQ2072227
Publication date: 26 January 2022
Published in: Journal of Mathematical Chemistry (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/2104.03454
Cites Work
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- Algebraic systems biology: a case study for the Wnt pathway
- Complex-linear invariants of biochemical networks
- Chemical reaction systems with toric steady states
- A linear programming approach to weak reversibility and linear conjugacy of chemical reaction networks
- Translated chemical reaction networks
- Toric dynamical systems
- Computing sparse and dense realizations of reaction kinetic systems
- A computational approach to steady state correspondence of regular and generalized mass action systems
- Identifiability of chemical reaction networks
- The center problem for the Lotka reactions with generalized mass-action kinetics
- The existence and uniqueness of steady states for a class of chemical reaction networks
- Multiple steady states for chemical reaction networks of deficiency one
- Computing weakly reversible linearly conjugate chemical reaction networks with minimal defi\-ciency
- Network translation and steady-state properties of chemical reaction systems
- A generalization of Birch's theorem and vertex-balanced steady states for generalized mass-action systems
- Complex-balanced equilibria of generalized mass-action systems: necessary conditions for linear stability
- On global stability of the Lotka reactions with generalized mass-action kinetics
- A deficiency-based approach to parametrizing positive equilibria of biochemical reaction systems
- Computing weakly reversible deficiency zero network translations using elementary flux modes
- Generalized Mass-Action Systems and Positive Solutions of Polynomial Equations with Real and Symbolic Exponents (Invited Talk)
- The Structure of MESSI Biological Systems
- Generalized Mass Action Systems: Complex Balancing Equilibria and Sign Vectors of the Stoichiometric and Kinetic-Order Subspaces
- Multiple Equilibria in Complex Chemical Reaction Networks: I. The Injectivity Property
- Multiple Equilibria in Complex Chemical Reaction Networks: II. The Species-Reaction Graph
- Sign conditions for injectivity of generalized polynomial maps with applications to chemical reaction networks and real algebraic geometry
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