We establish interpolation formulæ for operator spaces that are components of a given quasi-normed operator ideal. Sometimes we assume that one of the couples involved is quasi-linearizable, some other times we assume injectivity or surjectivity in the ideal. We also show the necessity of these suppositions.

Let $1\le q<p<\infty$ and $1/r:=1/pmax(q/2,1)$. We prove that ${ℒ}_{r,p}^{\left(c\right)}$, the ideal of operators of Geľfand type $l_{r,p}$, is contained in the ideal ${\Pi }_{p,q}$ of $(p,q)$-absolutely summing operators. For $q>2$ this generalizes a result of G. Bennett given for operators on a Hilbert space.

This survey features some recent developments concerning the bounded approximation property in Banach spaces. As a central theme, we discuss the weak bounded approximation property and the approximation property which is bounded for a Banach operator ideal. We also include an overview around the related long-standing open problem: Is the approximation property of a dual Banach space always metric?

It is well known that the only proper non-trivial norm closed ideal in the algebra L(X) for $X={\ell }_p$ (1 ≤ p < ∞) or X = c₀ is the ideal of compact operators. The next natural question is to describe all closed ideals of $L\left({\ell }_p\oplus {\ell }_q\right)$ for 1 ≤ p,q < ∞, p ≠ q, or equivalently, the closed ideals in $L({\ell }_p,{\ell }_q)$ for p < q. This paper shows that for 1 < p < 2 < q < ∞ there are at least four distinct proper closed ideals in $L({\ell }_p,{\ell }_q)$, including one that has not been studied before. The proofs use various methods from Banach...

We show results about the existence and the nonexistence of a projection from the space $L(L^1\left(\lambda \right),X)$ of all linear and bounded operators from $L^1\left(\lambda \right)$ into $X$ onto the subspace $R(L^1\left(\lambda \right),X)$ of all representable operators.

We define an interpolation norm on tensor products of p-integrable function spaces and Banach spaces which satisfies intermediate properties between the Bochner norm and the injective norm. We obtain substitutes of the Chevet-Persson-Saphar inequalities for this case. We also use the calculus of traced tensor norms in order to obtain a tensor product description of the tensor norm associated to the interpolated ideal of (p, sigma)-absolutely continuous operators defined by Jarchow and Matter. As...

Let be a locally compact abelian group and let 1 < p ≤ 2. ’ is the dual group of , and p’ the conjugate exponent of p. An operator T between Banach spaces X and Y is said to be compatible with the Fourier transform $F^{}$ if $F^{}\otimes T:L_p\left(\right)\otimes X\to L_{p^{\text{'}}}{(}^{\text{'}})\otimes Y$ admits a continuous extension $[F^{},T]:[L_p\left(\right),X]\to [L_{p^{\text{'}}}{(}^{\text{'}}),Y]$. Let $ℱT_p^{}$ denote the collection of such T’s. We show that $ℱT_p^{ℝ\times }=ℱT_p^{\mathbb{Z}\times }=ℱT_p^{\mathbb{Z}ⁿ\times }$ for any and positive integer n. Moreover, if the factor group of by its identity component is a direct sum of a torsion-free group and a finite group with discrete topology then $ℱT_p^{}=ℱT_p^{\mathbb{Z}}$.

Given a vector measure m with values in a Banach space X, a desirable property (when available) of the associated Banach function space L¹(m) of all m-integrable functions is that L¹(m) = L¹(|m|), where |m| is the [0,∞]-valued variation measure of m. Closely connected to m is its X-valued integration map Iₘ: f ↦ ∫f dm for f ∈ L¹(m). Many traditional operators from analysis arise as integration maps in this way. A detailed study is made of the connection between the property L¹(m) = L¹(|m|) and the...

In questo lavoro, motivati dalla teoria di Fredholm in spazi di Banach e dalla cosiddetta teoria degli ideali di operatori nel senso di Pietsch, viene definito un nuovo concetto di semigruppo di operatori. Questa nuova definizione include quella di molte classi di operatori già studiate in letteratura, come la classe degli operatori di semi-Fredholm, quella degli operatori tauberiani ed altre ancora. Inoltre permette un nuovo ed unificante approccio ad una serie di problemi in teoria degli operatori...

A new, unified presentation of the ideal norms of factorization of operators through Banach lattices and related ideal norms is given.