Sections induced from weakly sequentially complete spaces
Segal algebras, approximate identities and norm irregularity in C₀(X,A)
We study three closely related concepts in the context of the Banach algebra C₀(X,A). We show that, to a certain extent, Segal extensions, norm irregularity and the existence of approximate identities in C₀(X,A) can be deduced from the corresponding features of A and vice versa. Extensive use is made of the multiplier norm and the tensor product representation of C₀(X,A).
Segal Algebras with Functorial Properties.
Selbstadjungierte Differentialoperatoren erster Ordnung in A2 (Co).
Seminorme submoltiplicative su algebre di funzioni
In this note we study algebra seminorms on a functions algebra and we relate the existence of algebra norms on with the topology of . Also a theorem, that states which are the continuous characters, is demonstrated in a class of seminormed algebras.
Sequence space representations for (DFN)-algebras of entire functions modulo closed ideals.
Sequence spaces and interpolation problems for analytic functions
Sets in which the Besov norm in attained.
Sets of interpolation for Fourier transforms of bimeasures
Several characterizations for the special atom spaces with applications.
The theory of functions plays an important role in harmonic analysis. Because of this, it turns out that some spaces of analytic functions have been studied extensively, such as Hp-spaces, Bergman spaces, etc. One of the major insights that has developed in the study of Hp-spaces is what we call the real atomic characterization of these spaces.
Several variable spectral theory in the noncommutative case
Shilov boundary for holomorphic functions on some classical Banach spaces
Let be the Banach space of all bounded and continuous functions on the closed unit ball of a complex Banach space X and holomorphic on the open unit ball, with sup norm, and let be the subspace of of those functions which are uniformly continuous on . A subset is a boundary for if for every . We prove that for X = d(w,1) (the Lorentz sequence space) and X = C₁(H), the trace class operators, there is a minimal closed boundary for . On the other hand, for X = , the Schreier space,...
Shilov Points and Shilov Boundaries.
Sigma-convergence of stationary Navier-Stokes type equations.
Simultaneous stabilization in
We study the problem of simultaneous stabilization for the algebra . Invertible pairs , j = 1,..., n, in a commutative unital algebra are called simultaneously stabilizable if there exists a pair (α,β) of elements such that is invertible in this algebra for j = 1,..., n. For n = 2, the simultaneous stabilization problem admits a positive solution for any data if and only if the Bass stable rank of the algebra is one. Since has stable rank two, we are faced here with a different situation....
Sizes of quotient spaces of certain function algebras on topological semigroups
Small bound isomorphisms of the domain of a closed *-derivation.
Small deformations of topological algebras
We investigate stability of various classes of topological algebras and individual algebras under small deformations of multiplication.
Smoothness properties of functions in at certain boundary points.