Subideals of Operators – A Survey and Introduction to Subideal-Traces

Abstract: Operator ideals in B(H) are well understood and exploited but ideals inside them have only recently been studied starting with the 1983 seminal work of Fong and Radjavi and continuing with two recent articles by the authors of this survey. This article surveys this study embodied in these three articles. A subideal is a two-sided ideal of J (for specificity also called a J-ideal) for J an arbitrary ideal of B(H). In this terminology we alternatively call J a B(H)-ideal.This surveys [5], [13] and [14] in which … Show more

“…We will show that, surprisingly enough, the above property fails in general for closed subideals of L(X). We will adhere to the terminology suggested by Patnaik and Weiss [16], [17], and say that J is an I-subideal of L(X), if J ⊂ I, where I is an ideal of L(X) and J is an ideal of I. We will only be concerned with closed linear subideals, that is, J ⊂ I are closed linear subspaces of L(X), such that U S ∈ J and SU ∈ J whenever S ∈ J and U ∈ I (and similarly for I ⊂ L(X)).…”

“…[9,Theorem 1] or [16,Example 1.3]. References [16] and [17] also discuss ring-theoretic subideals of L(H), which will not play any role here.…”

Exotic closed subideals of algebras of bounded operators

“…We will show that, surprisingly enough, the above property fails in general for closed subideals of L(X). We will adhere to the terminology suggested by Patnaik and Weiss [16], [17], and say that J is an I-subideal of L(X), if J ⊂ I, where I is an ideal of L(X) and J is an ideal of I. We will only be concerned with closed linear subideals, that is, J ⊂ I are closed linear subspaces of L(X), such that U S ∈ J and SU ∈ J whenever S ∈ J and U ∈ I (and similarly for I ⊂ L(X)).…”

“…[9,Theorem 1] or [16,Example 1.3]. References [16] and [17] also discuss ring-theoretic subideals of L(H), which will not play any role here.…”

Exotic closed subideals of algebras of bounded operators

Exotic closed subideals of algebras of bounded operators