Hostname: page-component-586b7cd67f-dlnhk Total loading time: 0 Render date: 2024-11-28T06:49:11.841Z Has data issue: false hasContentIssue false
  • English
  • Français

The integral formula for the reduced algebraic multiplicity of meromorphic operator functions

Published online by Cambridge University Press:  20 January 2009

H. Bart ,
M. A. Kaashoek  and
D. C. Lay
H. Bart
Affiliation:
Wiskundig Seminarium, Vrije University, Amsterdam-11
M. A. Kaashoek
Affiliation:
Wiskundig Seminarium, Vrije University, Amsterdam-11
D. C. Lay
Affiliation:
Department of Mathematics, University of Maryland, College Park, Md. 20742
Rights & Permissions [Opens in a new window]

Extract

Core share and HTML view are not available for this content. However, as you have access to this content, a full PDF is available via the ‘Save PDF’ action button.

Throughout this paper A denotes an operator function, holomorphic on a deletedneighborhood of a complex number λo, with values in the space ℒ(X,Y) of boundedlinear operators between two complex Banach spaces X and Y. In his survey article(7), I. C. Gohberg has defined for such an arbitrary operator function A the algebraic multiplicity RM(Ao) and the reduced algebraic multiplicity RM(Ao) of A at λo. In earlier papers (e.g., (8, 16)) these notions have been defined and studied for morerestricted classes of operator functions. In (8) Gohberg and Sigal treated the case when A is finite-meromorphic at λo, A(λ) is bijective for λ in some deleted neighbor-hood of λo and the constant term A0 in the Laurent expansion of A at λo is aFredholm operator. They proved that in this case

Type
Research Article
Information
Proceedings of the Edinburgh Mathematical Society , Volume 21 , Issue 1 , March 1978 , pp. 65 - 71
Copyright
Copyright © Edinburgh Mathematical Society 1978

References

REFERENCES

(1) Bart, H., Holomorphic relative inverses of operator valued functions, Math. Ann. 208 (1974), 179194.CrossRefGoogle Scholar
(2) Bart, H., Poles of the resolvent of an operator function, Proc. Royal Irish Acad. 74 A (1974), 169184.Google Scholar
(3) Bart, H., Kaashoek, M. A. and Lay, D. C., Stability properties of finite meromorphic operator functions, Nederl. Akad. Wetensch. Proc. Ser. A 77 (1974), 217259.CrossRefGoogle Scholar
(4) Bart, H., Kaashoek, M. A. and Lay, D. C., Relative inverses of meromorphic operator functions, University of Maryland Technical Report, TR–74–71, 1974.Google Scholar
(5) Bart, H., Kaashoek, M. A. and Lay, D. C., Relative inverses of meromorphic operator functions and associated holomorphic projection functions, Math. Ann. 218 (1975), 199210.CrossRefGoogle Scholar
(6) Bart, H., Kaashoek, M. A. and Lay, D. C., Reduced algebraic multiplicity of operator functions, University of Maryland Technical Report, TR–74–56, 1974.Google Scholar
(7) Gohberg, I. C., On some topics of spectral theory of finitely meromorphic operator functions, Izv. Akad. Nauk. Armjan SSR Ser. Mat. 6 (1971), 160181.Google Scholar
(8) Gohberg, I. C. and Sigal, E. I., An operator generalisation of the logarithmic residue theorem and the theorem of Rouche, Mat. Sb. 84 (126) (1971), 607629Google Scholar
[Russian] = Math. USSR Sbornik 13 (1971), 603625.CrossRefGoogle Scholar
(9) Gohberg, I. C. and Sigal, E. I., On the zero multiplicity of the product of meromorphic operator functions, Mat. Issled. 6 (1971), No. 2 (20), 3350. [Russian]Google Scholar
(10) Kaashoek, M. A., Ascent, descent, nullity and defect, a note on a paper by A. E. Taylor, Math. Ann. 172 (1967), 105115.CrossRefGoogle Scholar
11) Kato, T., Perturbation theory for linear operators, (Springer, Berlin-New York, 1966).Google Scholar
(12) Keldyš, M. V., On the eigenvalues and eigenfunctions of certain classes of nonselfad- joint equations, Dokl. Akad. Nauk SSSR 77 (1) (1951), 1114. [Russian]Google Scholar
(13) Markus, A. S. and Sigal, E. I., On the multiplicity of a characteristic value of an analytic operator-valued function, Mat. Issled. 5 (1970), No. 3 (17), 129147. [Russian]Google Scholar
(14) Shubin, M. A., On holomorphic families of subspaces of a Banach space, Mat. Issled. 5 (1970), No. 4 (18), 153165;Google Scholar
Letter to the editors, Mat. Issled. 6 (1971), No. 1 (19), 180. [Russian]Google Scholar
(15) Sigal, E. I., On the multiplicity of a characteristic value of a product of operatorvalued functions, Mat. Issled. 5 (1970), No. 1 (15), 118127. [Russian]Google Scholar
(16) Sigal, E. I., Factor-multiplicity of eigenvalues of meromorphic operator functions, Mat. Issled. 5 (1970), No. 4 (18), 136152. [Russian]Google Scholar