Let D, X be two Banach spaces such that D is continuously embedded in X and let {A(t)} be a family of linear continuous operators from D to X. We assume that each operator A(t) has maximal regularity. Then we show under some additional hypothesis that the non-autonomous problem (P) u_t +A(t)u = f, u(0) = x, is well-posed in Lp. If the operators A(t) are accretive, we show that conversely, well-posedness of (P ) implies that A(t) has maximal regularity for all t. We also consider the non-autonomous second order problem u_{tt}+ B(t)u_t +A(t)u = f, u(0) = x, u_t(0) = y, for which we prove similar regularity and perturbation results.

L\sp p-maximal regularity for non-autonomous evolution equations

FORNARO, SIMONA;
2007-01-01

Abstract

Let D, X be two Banach spaces such that D is continuously embedded in X and let {A(t)} be a family of linear continuous operators from D to X. We assume that each operator A(t) has maximal regularity. Then we show under some additional hypothesis that the non-autonomous problem (P) u_t +A(t)u = f, u(0) = x, is well-posed in Lp. If the operators A(t) are accretive, we show that conversely, well-posedness of (P ) implies that A(t) has maximal regularity for all t. We also consider the non-autonomous second order problem u_{tt}+ B(t)u_t +A(t)u = f, u(0) = x, u_t(0) = y, for which we prove similar regularity and perturbation results.
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/11571/137931
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