A Relation between Diagonal and Unconditional Basis Constants.
A remark on p-integral and p-absolutely summing operators form into
A remark on the d-characteristic and the -characteristic of linear operators in a Banach space
A remark on the multipliers on spaces of Weak Products of functions
If H denotes a Hilbert space of analytic functions on a region Ω ⊆ Cd , then the weak product is defined by [...] We prove that if H is a first order holomorphic Besov Hilbert space on the unit ball of Cd , then the multiplier algebras of H and of H ⊙ H coincide.
A remark to a paper of Janas “Toeplitz operators related to certain domains in ”
A unified approach to the strong approximation property and the weak bounded approximation property of Banach spaces
We consider convex versions of the strong approximation property and the weak bounded approximation property and develop a unified approach to their treatment introducing the inner and outer Λ-bounded approximation properties for a pair consisting of an operator ideal and a space ideal. We characterize this type of properties in a general setting and, using the isometric DFJP-factorization of operator ideals, provide a range of examples for this characterization, eventually answering a question...
Acotación y sumabilidad en ideales de operadores compactos en espacios de Hilbert.
Additivity of maps on triangular algebras.
Algebra isomorphisms between standard operator algebras
If X and Y are Banach spaces, then subalgebras ⊂ B(X) and ⊂ B(Y), not necessarily unital nor complete, are called standard operator algebras if they contain all finite rank operators on X and Y respectively. The peripheral spectrum of A ∈ is the set of spectral values of A of maximum modulus, and a map φ: → is called peripherally-multiplicative if it satisfies the equation for all A,B ∈ . We show that any peripherally-multiplicative and surjective map φ: → , neither assumed to be linear nor...
Algebra of multipliers on the space of real analytic functions of one variable
We consider the topological algebra of (Taylor) multipliers on spaces of real analytic functions of one variable, i.e., maps for which monomials are eigenvectors. We describe multiplicative functionals and algebra homomorphisms on that algebra as well as idempotents in it. We show that it is never a Q-algebra and never locally m-convex. In particular, we show that Taylor multiplier sequences cease to be so after most permutations.
Algebraic and essentially algebraic composition operators on C(X).
Algebraic generation of B(X) by two subalgebras with square zero
Algebraic isomorphisms and Jordan derivations of 𝒥-subspace lattice algebras
It is shown that every algebraic isomorphism between standard subalgebras of 𝒥-subspace lattice algebras is quasi-spatial and every Jordan derivation of standard subalgebras of 𝒥-subspace lattice algebras is an additive derivation. Also, it is proved that every finite rank operator in a 𝒥-subspace lattice algebra can be written as a finite sum of rank one operators each belonging to that algebra. As an additional result, a multiplicative bijection of a 𝒥-subspace lattice algebra onto an arbitrary...
Algebraic operators and moments on algebraic sets.
*-algebras of unbounded operators affiliated with a von Neumann algebra.
Algèbres duales uniformes d'opérateurs sur l'espace de Hilbert
Almost exactness in normed spaces II
In the normed space of bounded operators between a pair of normed spaces, the set of operators which are "bounded below" forms the interior of the set of one-one operators. This note is concerned with the extension of this observation to certain spaces of pairs of operators.
Almost isomeric embeddings of in pre-duals of von Neumann algebras.
Amenability properties of Fourier algebras and Fourier-Stieltjes algebras: a survey
Let G be a locally compact group, and let A(G) and B(G) denote its Fourier and Fourier-Stieltjes algebras. These algebras are dual objects of the group and measure algebras, and M(G), in a sense which generalizes the Pontryagin duality theorem on abelian groups. We wish to consider the amenability properties of A(G) and B(G) and compare them to such properties for and M(G). For us, “amenability properties” refers to amenability, weak amenability, and biflatness, as well as some properties which...
An Analogue of a Hardy-Littlewood-Fejér Inequality for Upper Triangular Trace Class Operators.