José María Martell Berrocal , Dorina Mitrea, Irina Mitrea, Marius Mitrea
We show that the boundedness of the Hardy–Littlewood maximal operator on a Köthe function space X and on its Köthe dual X' is equivalent to the well-posedness of the X-Dirichlet and X'-Dirichlet problems inRn+ in the class of all second-order, homogeneous, elliptic systems, with constant complex coefficients. As a consequence, we obtain that the Dirichlet problem for such systems is well-posed for boundary data in Lebesgue spaces, variable exponent Lebesgue spaces, Lorentz spaces, Zygmund spaces, as well as their weighted versions. We also discuss a version of the aforementioned result which contains, as a particular case, the Dirichlet problem for elliptic systems with data in the classical Hardy space H1, and the Beurling-Hardy space HAp for p∈(1,∞). Based on the well-posedness of the LpLp-Dirichlet problem we then prove the uniqueness of the Poisson kernel associated with such systems, as well as the fact that they generate a strongly continuous semigroup in natural settings. Finally, we establish a general Fatou type theorem guaranteeing the existence of the pointwise nontangential boundary trace for null-solutions of such systems.
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