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W3026892735 abstract "Let $$Omega subseteq {mathbb {R}}^{d}$$ be open and A a complex uniformly strictly accretive $$dtimes d$$ matrix-valued function on $$Omega $$ with $$L^{infty }$$ coefficients. Consider the divergence-form operator $${{mathscr {L}}}^{A}=-mathrm{div},(Anabla )$$ with mixed boundary conditions on $$Omega $$ . We extend the bilinear inequality that we proved in Carbonaro and Dragičević (J Eur Math Soc, to appear) in the special case when $$Omega ={mathbb {R}}^{d}$$ . As a consequence, we obtain that the solution to the parabolic problem $$u^{prime }(t)+{{mathscr {L}}}^{A}u(t)=f(t)$$ , $$u(0)=0$$ , has maximal regularity in $$L^{p}(Omega )$$ , for all $$p>1$$ such that A satisfies the p-ellipticity condition that we introduced in Carbonaro and Dragičević (to appear). This range of exponents is optimal for the class of operators we consider. We do not impose any conditions on $$Omega $$ , in particular, we do not assume any regularity of $$partial Omega $$ , nor the existence of a Sobolev embedding. The methods of Carbonaro and Dragičević (to appear) do not apply directly to the present case and a new argument is needed." @default.
W3026892735 created "2020-05-29" @default.
W3026892735 creator A5078041788 @default.
W3026892735 creator A5080851662 @default.
W3026892735 date "2020-05-21" @default.
W3026892735 modified "2023-10-18" @default.
W3026892735 title "Bilinear embedding for divergence-form operators with complex coefficients on irregular domains" @default.
W3026892735 cites W133524872 @default.
W3026892735 cites W1529438536 @default.
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W3026892735 cites W179694669 @default.
W3026892735 cites W1842691486 @default.
W3026892735 cites W1901372027 @default.
W3026892735 cites W1936123822 @default.
W3026892735 cites W1963886393 @default.
W3026892735 cites W1970513870 @default.
W3026892735 cites W1970592390 @default.
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W3026892735 cites W1979840758 @default.
W3026892735 cites W1980858795 @default.
W3026892735 cites W1984720270 @default.
W3026892735 cites W1999568549 @default.
W3026892735 cites W2007365346 @default.
W3026892735 cites W2013678397 @default.
W3026892735 cites W2015560145 @default.
W3026892735 cites W2016832830 @default.
W3026892735 cites W2018790537 @default.
W3026892735 cites W2024814527 @default.
W3026892735 cites W2030020986 @default.
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W3026892735 cites W2055112143 @default.
W3026892735 cites W2068184654 @default.
W3026892735 cites W2073370369 @default.
W3026892735 cites W2073941076 @default.
W3026892735 cites W2078125833 @default.
W3026892735 cites W2080044970 @default.
W3026892735 cites W2080849219 @default.
W3026892735 cites W2080951455 @default.
W3026892735 cites W2089405868 @default.
W3026892735 cites W2090599458 @default.
W3026892735 cites W2095031546 @default.
W3026892735 cites W2095438542 @default.
W3026892735 cites W2113679219 @default.
W3026892735 cites W2162870478 @default.
W3026892735 cites W2163638184 @default.
W3026892735 cites W2479918603 @default.
W3026892735 cites W2555701908 @default.
W3026892735 cites W2565589190 @default.
W3026892735 cites W2574184929 @default.
W3026892735 cites W2779176309 @default.
W3026892735 cites W2945332856 @default.
W3026892735 cites W2962713652 @default.
W3026892735 cites W2962793070 @default.
W3026892735 cites W2963017638 @default.
W3026892735 cites W2964011196 @default.
W3026892735 cites W3014076162 @default.
W3026892735 cites W3098595474 @default.
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W3026892735 cites W585462275 @default.
W3026892735 cites W63946319 @default.
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W3026892735 doi "https://doi.org/10.1007/s00526-020-01751-3" @default.
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