Matrix transformations and generators of analytic semigroups.
Matrix transformations between the sequence space Bv^p and certain bk spaces
Matrix transformations between the spaces of Cesàro sequences and invariant means.
Matrix transformations involving analytic sequence spaces.
Matrix transformations involving analytic sequence spaces (Errata).
Matrix transformations on nuclear Köthe spaces
Matrixtransformationen dualer Folgenräume.
Matrixtransformationen von unvollstl;ndigen Folgenräumen.
Matsumoto -groups associated to certain shift spaces.
Maximal abelian subalgebras and projections in two Banach algebras associated with a topological dynamical system
If Σ = (X,σ) is a topological dynamical system, where X is a compact Hausdorff space and σ is a homeomorphism of X, then a crossed product Banach *-algebra ℓ¹(Σ) is naturally associated with these data. If X consists of one point, then ℓ¹(Σ) is the group algebra of the integers. The commutant C(X)₁' of C(X) in ℓ¹(Σ) is known to be a maximal abelian subalgebra which has non-zero intersection with each non-zero closed ideal, and the same holds for the commutant C(X)'⁎ of C(X) in C*(Σ), the enveloping...
Maximal additive and maximal multiplicative family for the family of -Darboux Baire one functions
Maximal function in Beurling-Orlicz and central Morrey-Orlicz spaces
We define Beurling-Orlicz spaces, weak Beurling-Orlicz spaces, Herz-Orlicz spaces, weak Herz-Orlicz spaces, central Morrey-Orlicz spaces and weak central Morrey-Orlicz spaces. Moreover, the strong-type and weak-type estimates of the Hardy-Littlewood maximal function on these spaces are investigated.
Maximal ideals in algebras of vector-valued functions.
Maximal ideals in the Lie algebra of vector fields
Maximal inequality in -uniform domains.
Maximal left ideals of the Banach algebra of bounded operators on a Banach space
Maximal operators, Lebesgue points and quasicontinuity in strongly nonlinear potential theory.
Maximal plurisubharmonic funtions on domains in Banach spaces.
Maximal regular boundary value problems in Banach-valued function spaces and applications.
Maximal regularity for a class of integro-differential equations with infinite delay in Banach spaces
We use Fourier multiplier theorems to establish maximal regularity results for a class of integro-differential equations with infinite delay in Banach spaces. Concrete equations of this type arise in viscoelasticity theory. Results are obtained for periodic solutions in the vector-valued Lebesgue and Besov spaces. An application to semilinear equations is considered.