Chiara Gallarati, Mark Veraar
Published 2015-10-26Version 1
In this paper we prove maximal $L^p$-regularity for a system of parabolic PDEs, where the elliptic operator $A$ has coefficients which depend on time in a measurable way and are continuous in the space variable. The proof is based on operator-theoretic methods and one of the main ingredients in the proof is the construction of an evolution family on weighted $L^q$-spaces.
Ultracontractivity and Gaussian bounds for evolution families associated with non-autonomous forms
Cobordism invariance of the index for realizations of elliptic operators revisited
Maximal regularity as a tool for partial differential equations
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