. . "On open problems concerning distributional chaos for triangular maps"@en . "Sm\u00EDtal, Jaroslav" . "18" . "19610" . . "3"^^ . "Distributional chaos; Triangular maps; Minimal set; Recurrent points; Topological entropy"@en . "On open problems concerning distributional chaos for triangular maps" . "http://www.sciencedirect.com/science/article/pii/S0362546X11005347" . "2"^^ . "P(GAP201/10/0887)" . "5"^^ . "RIV/47813059:19610/11:#0000297" . "000295714200044" . "Nonlinear Analysis. Theory, Methods & Applications" . "GB - Spojen\u00E9 kr\u00E1lovstv\u00ED Velk\u00E9 Brit\u00E1nie a Severn\u00EDho Irska" . "0362-546X" . "RIV/47813059:19610/11:#0000297!RIV12-GA0-19610___" . . "We show that in the class T of the triangular maps (x, y) bar right arrow (f(x), g(x)(y)) of the square there is a map of type 2(infinity) with non-minimal recurrent points which is not DC3. We also show that every DC1 continuous map of a compact metric space has a trajectory which cannot be (weakly) approximated by trajectories of compact periodic sets. These two results make possible to answer some open questions concerning classification of maps in T with zero topological entropy, and contribute to an old problem formulated by A.N. Sharkovsky."@en . "Balibrea, Francisco" . "10.1016/j.na.2011.07.052" . "We show that in the class T of the triangular maps (x, y) bar right arrow (f(x), g(x)(y)) of the square there is a map of type 2(infinity) with non-minimal recurrent points which is not DC3. We also show that every DC1 continuous map of a compact metric space has a trajectory which cannot be (weakly) approximated by trajectories of compact periodic sets. These two results make possible to answer some open questions concerning classification of maps in T with zero topological entropy, and contribute to an old problem formulated by A.N. Sharkovsky." . "\u0160tef\u00E1nkov\u00E1, Marta" . . . "[3CC0EDDEF3CE]" . . . . . "74" . "On open problems concerning distributional chaos for triangular maps"@en . . . . . "218089" . . . "On open problems concerning distributional chaos for triangular maps" . . . .