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Let T ∈ L(E)ⁿ be a commuting tuple of bounded linear operators on a complex Banach space E and let $σ_{F} (T) = σ (T) ∖ σ_{e} (T)$ be the non-essential spectrum of T. We show that, for each connected component M of the manifold $R e g (σ_{F} (T))$ of all smooth points of $σ_{F} (T)$ , there is a number p ∈ 0, ..., n such that, for each point z ∈ M, the dimensions of the cohomology groups $H^{p} ({(z - T)}^{k}, E)$ grow at least like the sequence ${(k^{d})}_{k \geq 1}$ with d = dim M.

Fredholm Theories of Mixed Type with Analytic Index Functions.

M. Breuer, R.S. Butcher (1974)

Mathematische Annalen

Fredholm theory and semilinear equations without resonance involving noncompact perturbations. I.

Milojević, P.S. (1987)

Publications de l'Institut Mathématique. Nouvelle Série

Fredholm theory in Banach algebras

M. Smyth (1982)

Banach Center Publications

Fredholm theory of holomorphic discs under the perturbation of boundary conditions.

Yong-Geun Oh (1996)

Mathematische Zeitschrift

Fredholm Theory Relative to a Banach Algebra Homomorphism.

Robin Harte (1982)

Mathematische Zeitschrift

Fredholmness of pseudo-differential operators with nonregular symbols

Kazushi Yoshitomi (2023)

Czechoslovak Mathematical Journal

We establish the Fredholmness of a pseudo-differential operator whose symbol is of class $C^{0, σ}$ , $0 < σ < 1$ , in the spatial variable. Our work here refines the work of H. Abels, C. Pfeuffer (2020).

Fredholmspektren verbundener Operatoren.

Volker Müller-Horrig (1979)

Mathematische Annalen

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Fredholm properties of elliptic operators on ℝⁿ [Book]

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