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A $C^{*}$ -algebraic Schoenberg theorem

Ola Bratteli, Palle E. T. Jorgensen, Akitaka Kishimoto, Donald W. Robinson (1984)

Annales de l'institut Fourier

Let $𝔄$ be a $C^{*}$ -algebra, $G$ a compact abelian group, $τ$ an action of $G$ by $*$ -automorphisms of $𝔄, 𝔄^{τ}$ the fixed point algebra of $τ$ and $𝔄_{F}$ the dense sub-algebra of $G$ -finite elements in $𝔄$ . Further let $H$ be a linear operator from $𝔄_{F}$ into $𝔄$ which commutes with $τ$ and vanishes on $𝔄^{τ}$ . We prove that $H$ is a complete dissipation if and only if $H$ is closable and its closure generates a $C_{0}$ -semigroup of completely positive contractions. These complete dissipations are classified in terms of certain twisted negative definite...

A compact evolution operator generated by a nonlinear time-dependent m-accretive operator in a Banach space.

Athanassios G. Kartsatos (1995)

Mathematische Annalen

A generalization related to Schrödinger operatorswith a singular potential.

Diagana, Toka (2002)

International Journal of Mathematics and Mathematical Sciences

A new characterization of generators of differentiable semigroups.

Ioan I. Vrabie (2001)

RACSAM

A SOR Acceleration of Self-Adjoint and m-Accretive Splitting Iterative Solver for 2-D Neutron Transport Equation

O. Awono, J. Tagoudjeu (2010)

Mathematical Modelling of Natural Phenomena

We present an iterative method based on an infinite dimensional adaptation of the successive overrelaxation (SOR) algorithm for solving the 2-D neutron transport equation. In a wide range of application, the neutron transport operator admits a Self-Adjoint and m-Accretive Splitting (SAS). This splitting leads to an ADI-like iterative method which converges unconditionally and is equivalent to a fixed point problem where the operator is a 2 by 2 matrix...

About the adiabatic stability of resonant states

Pierre Lochak (1983)

Annales de l'I.H.P. Physique théorique

Accretive approximation in C*-algebras

Reiner Berntzen (1996)

Studia Mathematica

The problem of approximation by accretive elements in a unital C*-algebra suggested by P. R. Halmos is substantially solved. The key idea is the observation that accretive approximation can be regarded as a combination of positive and self-adjoint approximation. The approximation results are proved both in the C*-norm and in another, topologically equivalent norm.

An application to Kato's square root problem.

Diagana, Toka (2002)

International Journal of Mathematics and Mathematical Sciences

Approximately Invariant Subspaces for Unbounded Linear Operators. II.

Palle E.T. Jorgensen (1977)

Mathematische Annalen

Displaying 1 – 9 of 9

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