We provide regularity of solutions to a large class of evolution equations on Banach spaces where the generator is composed of a static principal part plus a non-autonomous perturbation. Regularity is examined with respect to the graph norm of the iterations of the principal part. The results are applied to the Schr\"odinger equation and conditions on a time-dependent scalar potential for regularity of the solution in higher Sobolev spaces are derived.
Mean-Field Convergence of Point Vortices without Regularity
Advances in theory of evolution equations of many colliding particles
Evolution Equations in Functional Derivatives of Many-Particle Systems
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