Parameter identification in a structured population model
This is an incremental theoretical contribution for mathematicians working on inverse problems in population dynamics.
The paper addresses parameter identification in a structured population model, proving uniqueness under certain assumptions and providing counterexamples when assumptions fail, with numerical validation.
We study parameter identification problems in a structured population model without mutations. Given measurements of the total population size or critical points of the population, we aim to recover its growth rate, death rate or initial distribution. We present uniqueness results under suitable assumptions and present counterexamples when these assumptions are violated. Our results a supplemented by numerical studies, either based on Tikhonov regularization or the use of explicit reconstruction formulas.