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A navier–stokes-type problem with high-order elliptic operator and applicationsThe existence, uniqueness and uniformly Lp estimates for solutions of a high-order abstract Navier
Stability of spectral characteristics of boundary value problems for 2 × 2 Dirac type systems. Applications to the damped string(Q)fQ,n=λQ,nfQ,n. Assuming boundary conditions (BC) to be strictly regular, we show that the mapping Q→ΛQ−Λ0 sends Lp([0,1];C
Orlicz-fractional maximal operators on weighted Lp spaces establish that the Lp -boundedness and the Fefferman-Stein type inequality of Orlicz maximal operator
Lᵖ Regularity of the Solution of the Heat Equation with Discontinuous Coefficients-Grisvard and
Dore-Venni, we prove that the solution can be splited into a regular part in Lp-Sobolev space
Characterizations for the fractional maximal operator and its commutators on total Morrey spaces of the fractional maximal operator Mα on total Morrey spaces Lp,λ,μ(Rn), respectively. Also we give necessary
Embedding of vector-valued Morrey spaces and separable differential operators spaces are proved. As a consequence, maximal regularity for solutions of infinite systems of anisitropic
Characterizations of commutators of the maximal function in total Morrey spaces on stratified Lie groupsThe aim of this paper is to study the maximal commutators Mb and the commutators of the maximal
Necessary and sufficient conditions for the boundedness of the maximal operator from lebesgue spaces to morrey-type spacesIt is proved that the boundedness of the maximal operator M from a Lebesgue space Lp1 (Rn) to a
On the Boundedness of Maximal Operators Associated with Singular SurfacesThe paper is devoted to investigate maximal operators associated with singular surfaces
Venttsel boundary value problems with discontinuous data with discontinuous coefficients. On the basis of the a priori estimates obtained, maximal regularity and strong
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