Some Results on Injectivity and Multistationarity in Chemical Reaction Networks

Banaji, Murad; Pantea, Casian

doi:10.1137/15m1034441

Cited by 53 publications

(121 citation statements)

References 50 publications

(132 reference statements)

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“…In real systems, the free energies of the various solutions may not be identical, in which case only the minimum value represents thermodynamic equilibrium and the other points will be local minima, and over time, the system will tend to approach its equilibrium. However, many cases of bistability and multistability that have been studied, both theoretically and experimentally, are kinetic steady‐state solutions in open, dissipative systems that also display various types of switching among these states ,,,,,,,,,,,,,. We note that our solutions are obtained by using the same mathematical methods, that is, by using mass‐action kinetics to find the points at which the rates of production are zero and are, therefore, closed‐system analogues to the previous solutions.…”

Section: Discussionmentioning

confidence: 89%

Bistability and Bifurcation in Minimal Self‐Replication and Nonenzymatic Catalytic Networks

et al. 2017

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Bistability and bifurcation, found in a wide range of biochemical networks, are central to the proper function of living systems. We investigate herein recent model systems that show bistable behavior based on nonenzymatic self‐replication reactions. Such models were used before to investigate catalytic growth, chemical logic operations, and additional processes of self‐organization leading to complexification. By solving for their steady‐state solutions by using various analytical and numerical methods, we analyze how and when these systems yield bistability and bifurcation and discover specific cases and conditions producing bistability. We demonstrate that the onset of bistability requires at least second‐order catalysis and results from a mismatch between the various forward and reverse processes. Our findings may have far‐reaching implications in understanding early evolutionary processes of complexification, emergence, and potentially the origin of life.

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Section: Discussionmentioning

confidence: 89%

Bistability and Bifurcation in Minimal Self‐Replication and Nonenzymatic Catalytic Networks

et al. 2017

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“…More details and examples about the use of the Jacobian criterion can be found in . Further results and generalizations for closed or “semi‐open” systems can be found in .…”

Section: Multistability and Chemical Switchesmentioning

confidence: 99%

Mathematical Analysis of Chemical Reaction Systems

Crăciun

2018

Israel Journal of Chemistry

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The use of mathematical methods for the analysis of chemical reaction systems has a very long history, and involves many types of models: deterministic versus stochastic, continuous versus discrete, and homogeneous versus spatially distributed. Here we focus on mathematical models based on deterministic mass‐action kinetics. These models are systems of coupled nonlinear differential equations on the positive orthant. We explain how mathematical properties of the solutions of mass‐action systems are strongly related to key properties of the networks of chemical reactions that generate them, such as specific versions of reversibility and feedback interactions.

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“…1. biology, and the development of new and powerful mathematical techniques. A very fruitful area of research has been in identifying conditions for multiple positive steady states in reaction networks [1,6,7,8,9]. In particular, the cycle structure of the SR graph [1] or DSR graph [7] associated to a network may rule out bistability for any choice of rate constants.…”

Section: B Reaction Network Theorymentioning

confidence: 99%