Identyfikatory
Warianty tytułu
Języki publikacji
Abstrakty
Opial presented in 1967 a theorem, which can be applied in order to prove the weak convergence of sequences (xk) in a Hilbert space, generated by iterative schemes of the form xk+1= Uxk for a nonexpansive and asymptotically regular operator U with nonempty Fix U. Several iterative schemes have, however, the form xk+i1 = UkXk, where (Uk) is a sequence of operators with a common fixed point. We show that under some conditions on the sequence (Uk) the sequence (xk) converges weakly to a common fixed point of operators Uk- We show also that the Opial's theorem and the Krasnoselskii-Mann theorem are the corollaries descending from the obtained results. Finally, we present some applications of the results to the convex feasibility problems.
Czasopismo
Rocznik
Tom
Strony
601--610
Opis fizyczny
Bibliogr. 14 poz.
Twórcy
autor
- Faculty of Mathematics, Computer Sciences and Econometrics, University of Zielona Gora, ul. Szafrana 4a, 65-516 Zielona Gora, Poland
Bibliografia
- BAUSCHKE, H. and BORWEIN, J. (1994) Dykstra’s Alternating Projection Algorithm for Two Sets. Journal of Approximation Theory 79, 418-443.
- BAUSCHKE, H. and BORWEIN, J. (1996) On projection algorithms for solving convex feasibility problems. SIAM Review 38, 367-426.
- BYRNE, C. (2002) Iterative oblique projection onto convex sets and the split feasibility problem. Inverse Problems 18, 441-453.
- BYRNE, C. (2004) A unified treatment of some iterative algorithms in signal processing and image reconstruction. Inverse Problems 20.
- CEGIELSKI, A. and SUCHOCKA, A. (2007) Relaxed alternating projection method (submitted).
- CENSOR, Y. and ELFVING, T. (1994) A multiprojection algorithm using Bregman projections in a product space. Numerical Algorithms 8, 221-239.
- CENSOR, Y. and ZENIOS, S.A. (1997) Parallel Optimization, Theory, Algorithms and Applications. Oxford University Press, New York.
- COMBETTES, P.L. (1994) Inconsistent signal feasibility problems: least-square solutions in a product space. IEEE Trans. Signal Processing 42, 2955-2866.
- COMBETTES, P.L. (1997) Hilbertian convex feasibility problem: convergence of projection methods. Applied Mathematics and Optimization 35, 311-330.
- GOEBEL, K. and KIRK, W.A. (1990) Topics in Metric Fixed Point Theory. Cambridge University Press.
- KRASNOSELSKII, M.A. (1955) Two remarks on the method of successive approximations (Russian). Uspehi Mat. Nauk (N.S.) 10, 123-127.
- OPIAL, Z. (1967) Weak convergence of the sequence of successive approximations for nonexpansive mappings. Bull. Amer. Math. Soc. 73, 591-597.
- ROLEWICZ, S. (1984) Metric Linear Spaces. Polish Scientific Publishers, Warszawa, D. Reidel Publishing Company, Dordrecht.
- STARK, H. and YANG, Y. (1998) Vector Space Projections. John Wiley&Sons, New York.
Typ dokumentu
Bibliografia
Identyfikator YADDA
bwmeta1.element.baztech-article-BAT5-0017-0057