Fixed points of analytic operators in a Banach space and their applications

V. A. Khatskevich; D. M. Shoikhet

doi:10.1007/bf00969521

journal article Jan 01, 1984

Fixed points of analytic operators in a Banach space and their applications

V. A. Khatskevich D. M. Shoikhet

Siberian Mathematical Journal Vol. 25 No. 1 pp. 156-166 · Springer Science and Business Media LLC

View at Publisher Save 10.1007/bf00969521

Topics

No keywords indexed for this article. Browse by subject →

References

19

[1]

M. A. Krasnosel'skii et al., Approximate Solution of Operator Equations [in Russian], Nauka, Moscow (1969).

[2]

A. A. Ivanov, “Fixed points of mappings of metric spaces,” in: Investigations in Topology, Vol. 11, J. Sov. Math.,12, No. 1 (1979). 10.1007/bf01098415

[3]

D. M. Shoikhet, Some Properties of Analytic Operators in a Banach Space and Inversion Theorems [in Russian], Karsnoyarsk (1980).

[4]

L. Schwartz, Analysis [Russian translation], Vol. 2, Mir, Moscow (1972).

[5]

E. Hille and R. S. Phillips, Functional Analysis and Semigroups, Amer. Math. Soc. (1974).

[6]

D. M. Shoikhet, “Solvability conditions for equations with an analytic operator,” Preprint IFSO-15M, L. V. Kirenskii Institute of Physics, Siberian Branch of the Academy of Sciences of the USSR, Krasnoyarsk (1980).

[7]

L. A. Harris, “Schwartz-Pick systems of pseudometrics for domains in normed linear spaces,” in: Advances in Holomorphy, North-Holland (1979), pp. 345–406. 10.1016/s0304-0208(08)70766-7

[8]

K. T. Akhmedov, “Analytic method of Nekrasov-Nazarov in nonlinear analysis,” Usp. Mat. Nauk,12, No. 4, 135–154 (1957).

[9]

M. M. Vainberg and V. A. Trenogin, Theory of Bifurcation of Nonlinear Equations [in Russian], Nauka, Moscow (1969).

[10]

P. P. Rybin, “Analytic investigation of a perturbed linear integral equation,” Uch. Zap. Kazansk. Univ.,117, No. 2, 75–78 (1957).

[11]

V. A. Trenogin, Functional Analysis [in Russian], Nauka, Moscow (1980).

[12]

V. A. Khatskevich, “Application of the principle of compressive mappings to the theory of spaces with indefinite metric,”Funkts. Anal. Prilozhen.,12, No. 1, 88–89 (1978).

[13]

T. Ya. Azizov and S. A. Khoroshavin, “Invariant subspaces of operators acting on spaces with indefinite metric,” Funkts. Anal. Prilozhen.,14, No. 4, 1–7 (1980).

[14]

A. V. Sobolev and V. A. Khatskevich, “Definite invariant subspaces and the structure of the spectrum of a focussing plus-operator,” Funkts. Anal. Prilozhen.,15, No. 1, 84–85 (1981).

[15]

Ju. L. Daleckii and M. G. Krein, Stability of Solutions of Differential Equations in a Banach Space, Amer. Math. Soc. (1974).

[16]

V. A. Khatskevich, “Symmetry properties of a plus-operator and its adjoint,” in: Functional Analysis [in Russian], Vol. 14, Ul'yanovsk (1980), pp. 177–186.

[17]

C. L. Siegel, “Symplectic geometry,” Am. J. Math.,45, 1–86 (1943). 10.2307/2371774

[18]

M. G. Krein and Yu. L. Shmul'yan, “Linear-fractional transformations with operator coefficients,” Mat. Issled.,2, No. 3, 64–96, Kishinev (1967).

[19]

R. S. Phillips, “On symplectic mappings of contraction operators,”Stud. Math.,21, 15–27 (1968). 10.4064/sm-31-1-15-27

Metrics

3

Citations

19

References

Details

Published: Jan 01, 1984
Vol/Issue: 25(1)
Pages: 156-166
License: View

Authors

Cite This Article

V. A. Khatskevich, D. M. Shoikhet (1984). Fixed points of analytic operators in a Banach space and their applications. Siberian Mathematical Journal, 25(1), 156-166. https://doi.org/10.1007/bf00969521

Fixed points of analytic operators in a Banach space and their applications

You May Also Like