Let A be a linear closed densely defined operator in a complex Banach space X. If A is of type ω (i.e. the spectrum of A is contained in a sector of angle 2ω, symmetric around the real positive axis, and $\parallel \lambda {(\lambda I-A)}^{-1}\parallel$ is bounded outside every larger sector) and has a bounded inverse, then A has a bounded $H^{\infty }$ functional calculus in the real interpolation spaces between X and the domain of the operator itself.

Let A be a linear closed one-to-one operator in a complex Banach space X, having dense domain and dense range. If A is of type ω (i.e.the spectrum of A is contained in a sector of angle 2ω, symmetric about the real positive axis, and ${\left|\right|\lambda (\lambda I-A)}^{-1}\left|\right|$ is bounded outside every larger sector), then A has a bounded $H^{\infty }$ functional calculus in the real interpolation spaces between X and the intersection of the domain and the range of the operator itself.

In this paper integral formulae, based on Taylor's functional calculus for several operators, are found. Special cases of these formulae include those of Vasilescu and Janas, and an integral formula for commuting operators with real spectra.

Soit $f$ une transformée de Stieltjes. Notant $H_f$ un prolongement de la fonction $f\left(z^{-1}\right)$ à $(\mathbf{C}\setminus {\mathbf{R}}^{*}\cup \{\infty \left\}\right)$, on définit, pour tout espace de Banach $X$ et pour tout opérateur $V$ sur $X$ qui soit de domaine dense, fermé, d’ensemble résolvant contenant ${\mathbf{R}}^{*}$ et qui vérifie ${sup}_{\lambda \>0}\parallel (I+\lambda V{)}^{-1}\parallel \<\infty$, un opérateur $H_f\left(V\right)$ qui est un opérateur sur $X$ de même nature que $V$. On montre que l’on a ${\sigma }^e[H_f\left(V\right)]=H_f[{\sigma }^e\left(V\right)]$ (où ${\sigma }^e$ désigne le spectre étendu). En outre, l’opération $H_f$ a d’excellentes propriétés de stabilité. En particulier, si $f\ne 0$ et si $V$ est un potentiel abstrait, $H_f\left(V\right)$ est un potentiel...

Suppose A is an injective linear operator on a Banach space that generates a uniformly bounded strongly continuous semigroup ${e^{tA}}_{t\ge 0}$. It is shown that $A^{-1}$ generates an $O(1+\tau )A{(1-A)}^{-1}$-regularized semigroup. Several equivalences for $A^{-1}$ generating a strongly continuous semigroup are given. These are used to generate sufficient conditions on the growth of ${e^{tA}}_{t\ge 0}$, on subspaces, for $A^{-1}$ generating a strongly continuous semigroup, and to show that the inverse of -d/dx on the closure of its image in L¹([0,∞)) does not generate a strongly...

We consider a family of non-unimodular rank one NA-groups with roots not all positive, and we show that on these groups there exists a distinguished left invariant sub-Laplacian which admits a differentiable $L^p$ functional calculus for every p ≥ 1.

Mathematics Subject Classification: 26A33, 47A60, 30C15.In this paper we treat the question of existence and uniqueness of solutions of linear fractional partial differential equations. Along examples we show that, due to the global definition of fractional derivatives, uniqueness is only sure in case of global initial conditions.

We prove that a function f is a polynomial if G◦f is a polynomial for every bounded linear functional G. We also show that an operator-valued function is a polynomial if it is locally a polynomial.