Well-Posedness of Quasilinear Parabolic Equations in Time-Weighted Spaces

Abstract

Well-posedness in time-weighted spaces of certain quasilinear (and semilinear) parabolic evolution equations u'=A(u)u+f(u) is established. The focus lies on the case of strict inclusions dom(f)⊂neq dom(A) of the domains of the nonlinearities u f(u) and u A(u). Based on regularizing effects of parabolic equations it is shown that a semiflow is generated in intermediate spaces. In applications this allows one to derive global existence from weaker a priori estimates. The result is illustrated by examples of chemotaxis systems.

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