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Dynamics of doubly stochastic quadratic operators on a finite-dimensional simplex

Rawad AbdulghaforKulliyyah of Information and Communication Technology, International Islamic University Malaysia, 53100 Kuala Lumpur, MalaysiaFarruh ShahidiDepartment of Mathematics, Pennsylvania State University UP, State College PA, 16801, United States AmericaAkram M. ZekiKulliyyah of Information and Communication Technology, International Islamic University Malaysia, 53100 Kuala Lumpur, MalaysiaSherzod TuraevKulliyyah of Information and Communication Technology, International Islamic University Malaysia, 53100 Kuala Lumpur, Malaysia
2016en
ABI

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Abstract The present paper focuses on the dynamics of doubly stochastic quadratic operators (d.s.q.o) on a finite-dimensional simplex. We prove that if a d.s.q.o. has no periodic points then the trajectory of any initial point inside the simplex is convergent. We show that if d.s.q.o. is not a permutation then it has no periodic points on the interior of the two dimensional (2D) simplex. We also show that this property fails in higher dimensions. In addition, the paper also discusses the dynamics classifications of extreme points of d.s.q.o. on two dimensional simplex. As such, we provide some examples of d.s.q.o. which has a property that the trajectory of any initial point tends to the center of the simplex. We also provide and example of d.s.q.o. that has infinitely many fixed points and has infinitely many invariant curves. We therefore came-up with a number of evidences. Finally, we classify the dynamics of extreme points of d.s.q.o. on 2D simplex.

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