Asymptotic behavior of solutions to the generalized Becker-Döring equations for general initial data

Abstract We prove the following asymptotic behavior for solutions to the generalized Becker-Döring system for general initial data: under a detailed balance assumption and in situations where density is conserved in time, there is a critical density ρs such that solutions with an initial density ρ0 ≤ ρs converge strongly to the equilibrium with density ρ0, and solutions with initial density ρ0 > ρs converge (in a weak sense) to the equilibrium with density ρs. This extends the previous knowledge that this behavior happens under more restrictive conditions on the initial data. The main tool is a new estimate on the tail of solutions with density below the critical density.