The following pages link to Stefan Müller (Q246419):
Displaying 19 items.
- (Q589578) (redirect page) (← links)
- A generalized model of the repressilator (Q883792) (← links)
- The center problem for the Lotka reactions with generalized mass-action kinetics (Q1617223) (← links)
- Planar S-systems: global stability and the center problem (Q1757417) (← links)
- A generalization of Birch's theorem and vertex-balanced steady states for generalized mass-action systems (Q2045597) (← links)
- Complex-balanced equilibria of generalized mass-action systems: necessary conditions for linear stability (Q2045699) (← links)
- Detailed balance \(=\) complex balance \(+\) cycle balance: a graph-theoretic proof for reaction networks and Markov chains (Q2202053) (← links)
- Characterizing injectivity of classes of maps via classes of matrices (Q2273843) (← links)
- On global stability of the Lotka reactions with generalized mass-action kinetics (Q2412748) (← links)
- A deficiency-based approach to parametrizing positive equilibria of biochemical reaction systems (Q2417504) (← links)
- Enzyme allocation problems in kinetic metabolic networks: optimal solutions are elementary flux modes (Q2632634) (← links)
- Generalized Mass-Action Systems and Positive Solutions of Polynomial Equations with Real and Symbolic Exponents (Invited Talk) (Q2879334) (← links)
- Genetic Recombination as a Chemical Reaction Network (Q3454615) (← links)
- Generalized Mass Action Systems: Complex Balancing Equilibria and Sign Vectors of the Stoichiometric and Kinetic-Order Subspaces (Q4915212) (← links)
- On the Bijectivity of Families of Exponential/Generalized Polynomial Maps (Q5234533) (← links)
- Sign conditions for injectivity of generalized polynomial maps with applications to chemical reaction networks and real algebraic geometry (Q5963080) (← links)
- Sufficient Conditions for Linear Stability of Complex-Balanced Equilibria in Generalized Mass-Action Systems (Q6192103) (← links)
- Detailed balance = complex balance + cycle balance. A graph-theoretic proof for reaction networks and Markov chains (Q6336621) (← links)
- A SageMath package for elementary and sign vectors with applications to chemical reaction networks (Q6637806) (← links)