Hamiltonian Cycle on the Set of Genotypes and Non-Ergodic Quadratic Stochastic Operators

Details Hamiltonian Cycle on the Set of Genotypes and Non-Ergodic Quadratic Stochastic Operators Hamiltonian Cycle on the Set of Genotypes and Non-Ergodic Quadratic Stochastic Operators

2012-04-09

arxiv.org/abs/1204.1809v1

Mathematics

Dynamical Systems

10 pages

Scientific paper

On the set of genotypes $\Phi=\{1,...,m\}$ we introduce a binary relation generated by Volterra quadratic stochastic operator $V$ on $(m-1)$ dimensional simplex $S^{m-1}$ and prove that the operator $V$ be non-ergodic if either there exists a Hamiltonian cycle or one of the vertices $M_i=(\delta_{1i},\delta_{2i},...,\delta_{mi})$ of the simplex $S^{m-1}$ is a source and restriction of $V$ to the invariant face $F_i=\{x\in S^{m-1}: x_i=0\}$ is non-ergodic. In this paper we prove this result for $m=2,3,4.$

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