Asymptotic analysis of transmission problems with parameter-dependent Robin conditions
Abstract
We study a transmission problem of Neumann--Robin type involving a parameter α and perform an asymptotic analysis with respect to α. The limits α 0 and α +∞ correspond respectively to complete decoupling and full unification of the problem, and we obtain rates of convergence for both regimes. Biologically, the model describes two cells connected by a gap junction with permeability α: the case α 0 corresponds to a situation where the gap junction is closed, leaving only tight junctions between the cells so that no substance exchange occurs, while α +∞ corresponds to a situation that can be interpreted as the cells forming a single structure. We also clarify the relationship between the asymptotic analysis with respect to the parameter α and the asymptotics of the system in connection with the convergence of convex functionals known as Mosco convergence. Finally, we consider time-dependent permeability and analyze the case where α blows up in finite time. Under suitable regularity assumptions, we show that the solution can be extended beyond the blow-up time, remaining in the single structure regime.
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