Maximal regularity for evolution equations with critical singular perturbations
Abstract
Assuming A has maximal Lp-regularity, this paper investigates perturbations of A by time-dependent operators B that are unbounded and satisfy a critical Lq-integrability condition in time. We establish two main results. The first proves maximal Lp-regularity for the critical endpoint case, generalizing previous work by Pr\"uss and Schnaubelt (2001). The second develops a weighted maximal regularity theory for mixed-scale perturbations, motivated by the linearized skeleton equations appearing in large deviations theory for stochastic PDEs.
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