Add to ORKGWe investigate a broad family of stochastically modeled reaction networks by looking at their stationary distributions. Most known results on stationary distributions assume weak reversibility and zero deficiency. We first explicitly give product-form stationary distributions for a class of mostly non-weakly-reversible autocatalytic reaction networks of arbitrary deficiency. We provide examples of interest in statistical mechanics (inclusion process), life sciences, and robotics (collective decision making in ant and robot swarms). The product-form nature of the stationary distribution then enables the study of condensation in particle systems that are generalizations of the inclusion process
Autocatalytic cycles are rather common in biological systems and they might have played a major role...
Erworben im Rahmen der Schweizer Nationallizenzen (http://www.nationallizenzen.ch)Autocatalytic cycl...
Autocatalytic networks are widespread in nature, but theyare difficult to create or to reproduce in ...
Exact results for product-form stationary distributions of Markov chains are of interest in differen...
The phenomenon of discreteness-induced transitions is highly stochastic dependent dynamics observed ...
Stochastic modeling of chemical reaction systems based on master equations has been an indispensable...
We provide a theoretical analysis of some autocatalytic reaction networks exhibiting the phenomenon ...
We show that discrete distributions on the d-dimensional non-negative integer lattice can be approxi...
AbstractLong-term behaviors of biochemical reaction networks (BRNs) are described by steady states i...
Stochastic reaction networks are dynamical models of biochemical reaction systems and form a particu...
We investigate the relation between the stationary probability distribution of chemical reaction sys...
We show that discrete distributions on the d-dimensional non-negative integer lattice can be approxi...
Anderson, Craciun, and Kurtz have proved that a stochastically modelled chemical reaction system wit...
Stochastic reaction networks (SRNs) provide models of many real-world networks. Examples include net...
Anderson, Craciun and Kurtz have proved that a stochastically modelled chemical reaction system with...
Autocatalytic cycles are rather common in biological systems and they might have played a major role...
Erworben im Rahmen der Schweizer Nationallizenzen (http://www.nationallizenzen.ch)Autocatalytic cycl...
Autocatalytic networks are widespread in nature, but theyare difficult to create or to reproduce in ...
Exact results for product-form stationary distributions of Markov chains are of interest in differen...
The phenomenon of discreteness-induced transitions is highly stochastic dependent dynamics observed ...
Stochastic modeling of chemical reaction systems based on master equations has been an indispensable...
We provide a theoretical analysis of some autocatalytic reaction networks exhibiting the phenomenon ...
We show that discrete distributions on the d-dimensional non-negative integer lattice can be approxi...
AbstractLong-term behaviors of biochemical reaction networks (BRNs) are described by steady states i...
Stochastic reaction networks are dynamical models of biochemical reaction systems and form a particu...
We investigate the relation between the stationary probability distribution of chemical reaction sys...
We show that discrete distributions on the d-dimensional non-negative integer lattice can be approxi...
Anderson, Craciun, and Kurtz have proved that a stochastically modelled chemical reaction system wit...
Stochastic reaction networks (SRNs) provide models of many real-world networks. Examples include net...
Anderson, Craciun and Kurtz have proved that a stochastically modelled chemical reaction system with...
Autocatalytic cycles are rather common in biological systems and they might have played a major role...
Erworben im Rahmen der Schweizer Nationallizenzen (http://www.nationallizenzen.ch)Autocatalytic cycl...
Autocatalytic networks are widespread in nature, but theyare difficult to create or to reproduce in ...