The Kato decomposition of quasi-Fredholm relations

J.-Ph. Labrousse; A. Sandovici; H.S.V. de Snoo; H. Winkler

The Kato decomposition of quasi-Fredholm relations

J.-Ph. Labrousse, A. Sandovici, H.S.V. de Snoo, H. Winkler

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29 Citaten (Scopus)

Samenvatting

Quasi-Fredholm relations of degree d is an element of N in Hilbert spaces are defined in terms of conditions on their ranges and kernels. They are completely characterized in terms of an algebraic decomposition with a quasi-Fredholm relation of degree 0 and a nilpotent operator of degree d. The adjoint of a quasi-Fredholm relation of degree d is an element of N is shown to be quasi-Fredholm relation of degree d is an element of N. The class of quasi-Fredholm relations contains the semi-Fredholm relations. Earlier results for quasi-Fredholm operators and semi-Fredholm operators are included.

Originele taal-2	English
Pagina's (van-tot)	1-51
Aantal pagina's	51
Tijdschrift	Operators and matrices
Volume	4
Nummer van het tijdschrift	1
Status	Published - mrt-2010

Citeer dit

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title = "The Kato decomposition of quasi-Fredholm relations",

abstract = "Quasi-Fredholm relations of degree d is an element of N in Hilbert spaces are defined in terms of conditions on their ranges and kernels. They are completely characterized in terms of an algebraic decomposition with a quasi-Fredholm relation of degree 0 and a nilpotent operator of degree d. The adjoint of a quasi-Fredholm relation of degree d is an element of N is shown to be quasi-Fredholm relation of degree d is an element of N. The class of quasi-Fredholm relations contains the semi-Fredholm relations. Earlier results for quasi-Fredholm operators and semi-Fredholm operators are included.",

keywords = "Quasi-Fredholm relation, semi-Fredholm relation, Kato decomposition, LINEAR RELATIONS, OPERATORS, SPACES",

author = "J.-Ph. Labrousse and A. Sandovici and Snoo, {H.S.V. de} and H. Winkler",

note = "Relation: http://ele-math.com/ Rights: Element d.o.o.",

year = "2010",

month = mar,

language = "English",

volume = "4",

pages = "1--51",

journal = "Operators and matrices",

issn = "1846-3886",

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TY - JOUR

T1 - The Kato decomposition of quasi-Fredholm relations

AU - Labrousse, J.-Ph.

AU - Sandovici, A.

AU - Snoo, H.S.V. de

AU - Winkler, H.

N1 - Relation: http://ele-math.com/ Rights: Element d.o.o.

PY - 2010/3

Y1 - 2010/3

N2 - Quasi-Fredholm relations of degree d is an element of N in Hilbert spaces are defined in terms of conditions on their ranges and kernels. They are completely characterized in terms of an algebraic decomposition with a quasi-Fredholm relation of degree 0 and a nilpotent operator of degree d. The adjoint of a quasi-Fredholm relation of degree d is an element of N is shown to be quasi-Fredholm relation of degree d is an element of N. The class of quasi-Fredholm relations contains the semi-Fredholm relations. Earlier results for quasi-Fredholm operators and semi-Fredholm operators are included.

AB - Quasi-Fredholm relations of degree d is an element of N in Hilbert spaces are defined in terms of conditions on their ranges and kernels. They are completely characterized in terms of an algebraic decomposition with a quasi-Fredholm relation of degree 0 and a nilpotent operator of degree d. The adjoint of a quasi-Fredholm relation of degree d is an element of N is shown to be quasi-Fredholm relation of degree d is an element of N. The class of quasi-Fredholm relations contains the semi-Fredholm relations. Earlier results for quasi-Fredholm operators and semi-Fredholm operators are included.

KW - Quasi-Fredholm relation

KW - semi-Fredholm relation

KW - Kato decomposition

KW - LINEAR RELATIONS

KW - OPERATORS

KW - SPACES

M3 - Article

VL - 4

SP - 1

EP - 51

JO - Operators and matrices

JF - Operators and matrices

SN - 1846-3886

IS - 1

ER -