ZI-Closure Scheme: A Method to Solve and Study Stochastic Reaction Networks

“…The difference in the accuracy can be associated with the order of closure that is used to generate the LMEs (in this case 4 or , Figure 3 ). The accuracy of the Lagrange multipliers approach depends on the number of lower-order moments, M [ 29 ]. The higher the value of M , the more accurate results the method can produce.…”

“…After, a certain value of M , the improvement in accuracy is insignificant. For more information on how the lower-order moments affects probability distributions the reader is directed to the literature [ 29 ]. It has been reported that the Brusselator requires more than fourth-order moments for accurate results [ 46 ].…”

“…The solid lines are solutions calculated based on LMEs with tenth-order closure ( ). The closure order is chosen based on the findings of [ 29 ]. The dots represent results from 500,000 SSA trajectories.…”

“…To circumvent the challenges of solving moment equations in time, we propose the use of Lagrange multipliers [ 22 , 28 , 29 ]. The connection between moments and Lagrange multipliers relies on the maximum entropy principle, which states the system attains a probability distribution that maximizes its entropy [ 20 , 22 , 28 , 30 , 31 ].…”

Solving Stochastic Reaction Networks with Maximum Entropy Lagrange Multipliers

“…The difference in the accuracy can be associated with the order of closure that is used to generate the LMEs (in this case 4 or , Figure 3 ). The accuracy of the Lagrange multipliers approach depends on the number of lower-order moments, M [ 29 ]. The higher the value of M , the more accurate results the method can produce.…”

“…After, a certain value of M , the improvement in accuracy is insignificant. For more information on how the lower-order moments affects probability distributions the reader is directed to the literature [ 29 ]. It has been reported that the Brusselator requires more than fourth-order moments for accurate results [ 46 ].…”

“…The solid lines are solutions calculated based on LMEs with tenth-order closure ( ). The closure order is chosen based on the findings of [ 29 ]. The dots represent results from 500,000 SSA trajectories.…”

“…To circumvent the challenges of solving moment equations in time, we propose the use of Lagrange multipliers [ 22 , 28 , 29 ]. The connection between moments and Lagrange multipliers relies on the maximum entropy principle, which states the system attains a probability distribution that maximizes its entropy [ 20 , 22 , 28 , 30 , 31 ].…”

Solving Stochastic Reaction Networks with Maximum Entropy Lagrange Multipliers

“…The Jacobian matrix is given by: J i,j = ∂µ i ∂λ i = −µ i,j + µ i • µ j , where [8]. The algorithm of the application can be found in [9].…”

ZICS: an application for calculating the stationary probability distribution of stochastic reaction networks