Theory and Modern Applications
From: Numerical simulations for stochastic meme epidemic model
\({T}_{{i}} =\mbox{Transitions}\) | \({P}_{{i}} =\mbox{Probabilities}\) |
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\({T}_{1} = [1,0,0]^{{\mathrm{T}}}\) | \({P}_{1} ={B} \Delta {t}\) |
\({T}_{2} = [1,0,-1]^{{\mathrm{T}}}\) | \({P}_{2} = \eta Z \Delta {t}\) |
\({T}_{3} = [-1,0,1]^{{\mathrm{T}}}\) | \({P}_{3} = \alpha{SI}\Delta {t}\) |
\({T}_{4} = [-1,0,0]^{{\mathrm{T}}}\) | \({P}_{4} =\mu {S}\Delta {t}\) |
\({T}_{5} = [0,1,-1]^{{\mathrm{T}}}\) | \({P}_{5} =\alpha \theta {SI}\Delta{t}\) |
\(T_{6} = [ 0,-1,1 ]^{\mathrm{T}}\) | \({P}_{6} =\beta {I}^{2} \Delta {t}\) |
\(T_{7} = [ 0,-1,1 ]^{\mathrm{T}}\) | \({P}_{7} =\gamma {IZ}\Delta {t}\) |
\(T_{8} = [ 0,-1,0 ]^{\mathrm{T}}\) | \({P}_{8} =\mu {I}\Delta {t}\) |
\(T_{9} = [0,0,-1]^{\mathrm{T}}\) | \({P}_{9} =\mu {Z}\Delta {t} \) |