Weighted conditional expectation operators and nuclearity

M. S. Al Ghafri; S. Shamsigamchi; Y. Estaremi

Weighted conditional expectation operators and nuclearity

M. S. Al Ghafri, S. Shamsigamchi, Y. Estaremi

Abstract

We provide a characterisations of nuclear weighted conditional expectation operators on $L^p(μ)$-spaces, for $1\leq p<\infty$. As a consequence, when the underlying measure space is non-atomic, the only nuclear weighted conditional expectation operator on $L^p(μ)$-spaces is the zero operator.

Weighted conditional expectation operators and nuclearity

Abstract

We provide a characterisations of nuclear weighted conditional expectation operators on

-spaces, for

. As a consequence, when the underlying measure space is non-atomic, the only nuclear weighted conditional expectation operator on

-spaces is the zero operator.

Paper Structure (2 sections, 9 theorems, 57 equations)

This paper contains 2 sections, 9 theorems, 57 equations.

Introduction and Preliminaries
Main Results

Key Result

Theorem 2.1

Let $1\le p<\infty$ and let $T:X\to Y$ be absolutely $p$--summing. Then there exist $C>0$ and a Borel probability measure $\mu$ on the weak$^{*}$--compact unit ball $B_{X^*}$ such that In particular, for $p=1$,

Theorems & Definitions (19)

Definition 1.1
Theorem 2.1: Pietsch domination theorem die
Corollary 2.2
proof
Corollary 2.3
proof
Proposition 2.4
proof
Theorem 2.5
proof
...and 9 more

Weighted conditional expectation operators and nuclearity

Abstract

Weighted conditional expectation operators and nuclearity

Authors

Abstract

Table of Contents

Key Result

Theorems & Definitions (19)