Steady states of lattice population models with immigration
classification
🧮 math.PR
keywords
caseimmigrationlatticesteadybinarycarlemanconsidercumulants
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We consider the time evolution of the lattice subcritical Galton-Watson model with immigration. We prove Carleman type estimation for the cumulants in the simple case (binary splitting) and show the existence of a steady state. We also present the formula of the limiting distribution in a particular solvable case.
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