Recall that the Weyl's spectrum of a

**bounded linear operator**T on a Banach space X is the intersection of the spectra of its compact perturbations: [[sigma].This definition appears very rarely and is found in the following Acronym Finder categories:

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- Below the Line Observatory (France; marketing company)
- Beni-Lubero Online (political blog)
- Better Life Option
- Bike Like Object
- Binary Large Object
- Blower
- Boiled Linseed Oil (finishing oil applied to wood and metal)
- Booth Level Officer (elections; India)
- Border Liaison Office
- Boston Lyric Opera

- Bureau Line Office (Luxembourg; business furniture and equipment)
- Butt Line Zero
- body loan (micro-banking)
- Bacon, Lettuce, Onion, Avocado, & Tomato Sandwich
- Binary Lexical Octet Ad-Hoc Transport
- Buy Lots of Ammo Today
- Big Lump on Board (personel flying in a non crew position on military aircraft)
- Binary Large Object
- Biologically Liberated Organo-Beasties
- Blitter Object (computer architecture)

Recall that the Weyl's spectrum of a **bounded linear operator** T on a Banach space X is the intersection of the spectra of its compact perturbations: [[sigma].

i]: J [right arrow] J, i = 1, 2, f(t), t [member of] J is a **bounded linear operator**, and F, G, g are appropriate functions specified later.

00 Hardcover QA329 Diagana (mathematics, Howard University) introduces the basic properties of non-Archimedean Banach spaces, free Banach spaces, and non-Archimedean Hilbert spaces, and examines **bounded linear operators** on non-Archimedean Banach and Hilbert spaces.

Let [sigma](A) denote the spectrum of a matrix A, considered as a **bounded linear operator** on c.

Now, as in Section 2, we consider the **bounded linear operator** T : X([OMEGA]) [right arrow] X([OMEGA]) defined by Tf = u [member of] [V.

Almost all realization problems in the modern theory of non-selfadjoint operators and its applications deal with systems the main operator qf which is a **bounded linear operator**.

Introduction Let B(H) be the Banach Algebra of all **bounded linear operators** on a non-zero complex Hilbert space H.