TY - JOUR
T1 - On infinite dimensional quadratic Volterra operators
AU - Mukhamedov, Farruh
AU - Akin, Hasan
AU - Temir, Seyit
N1 - Funding Information:
Keywords: Volterra operator; Infinite dimensional space; Quadratic stochastic operator; Weak compact; Compatibility ✩ The work supported by NATO-TUBITAK PC-B programme. * Corresponding author. E-mail addresses: [email protected], [email protected] (F. Mukhamedov), [email protected] (H. Akin), [email protected] (S. Temir).
PY - 2005/10/15
Y1 - 2005/10/15
N2 - In this paper we study a class of quadratic operators named by Volterra operators on infinite dimensional space. We prove that such operators have infinitely many fixed points and the set of Volterra operators forms a convex compact set. In addition, it is described its extreme points. Besides, we study certain limit behaviors of such operators and give some more examples of Volterra operators for which their trajectories do not converge. Finally, we define a compatible sequence of finite dimensional Volterra operators and prove that any power of this sequence converges in weak topology.
AB - In this paper we study a class of quadratic operators named by Volterra operators on infinite dimensional space. We prove that such operators have infinitely many fixed points and the set of Volterra operators forms a convex compact set. In addition, it is described its extreme points. Besides, we study certain limit behaviors of such operators and give some more examples of Volterra operators for which their trajectories do not converge. Finally, we define a compatible sequence of finite dimensional Volterra operators and prove that any power of this sequence converges in weak topology.
KW - Compatibility
KW - Infinite dimensional space
KW - Quadratic stochastic operator
KW - Volterra operator
KW - Weak compact
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U2 - 10.1016/j.jmaa.2005.02.022
DO - 10.1016/j.jmaa.2005.02.022
M3 - Article
AN - SCOPUS:24044517197
SN - 0022-247X
VL - 310
SP - 533
EP - 556
JO - Journal of Mathematical Analysis and Applications
JF - Journal of Mathematical Analysis and Applications
IS - 2
ER -