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Given an infinite-dimensional Banach space Z (substituting the Hilbert space ℓ₂), the s-number sequence of Z-Weyl numbers is generated by the approximation numbers according to the pattern of the classical Weyl numbers. We compare Weyl numbers with Z-Weyl numbers-a problem originally posed by A. Pietsch. We recover a result of Hinrichs and the first author showing that the Weyl numbers are in a sense minimal. This emphasizes the outstanding role of Weyl numbers within the theory of eigenvalue distribution...

Weyl's theorem for algebraically absolute- $(p, r)$ -paranormal operators.

Senthilkumar, D., Maheswari Naik, P. (2011)

Banach Journal of Mathematical Analysis [electronic only]

Displaying 1 – 8 of 8

Weakly compact operators from a B-space into the space of Bochner integrable functions

Weakly Compact Operators on Jordan Triples.

Weakly unconditionally convergent series in M-ideals.

Weighted local Orlicz-Hardy spaces with applications to pseudo-differential operators [Book]

Weyl Numbers in Function Spaces.

Weyl Numbers in Function Spaces II.

Weyl numbers versus Z-Weyl numbers

Weyl's theorem for algebraically absolute- ( p , r ) -paranormal operators.

Currently displaying 1 – 8 of 8

Weyl's theorem for algebraically absolute- $(p, r)$ -paranormal operators.