"74" . "\u0160tef\u00E1nkov\u00E1, Marta" . . "000286178200015" . "A triangular map of type $2^{\\infty}$ with positive topological entropy on a minimal set" . "Sm\u00EDtal, Jaroslav" . "5" . . . "2"^^ . . "GB - Spojen\u00E9 kr\u00E1lovstv\u00ED Velk\u00E9 Brit\u00E1nie a Severn\u00EDho Irska" . "3"^^ . . "Minimal set; Skew-product map; Topological entropy"@en . "RIV/47813059:19610/11:#0000287" . . "A triangular map of type $2^{\\infty}$ with positive topological entropy on a minimal set"@en . "184237" . . "Z(MSM4781305904)" . . . "Balibrea, Francisco" . . "0362-546X" . "A triangular map of type $2^{\\infty}$ with positive topological entropy on a minimal set" . . "4"^^ . . "[39E230663860]" . "RIV/47813059:19610/11:#0000287!RIV11-MSM-19610___" . . . . "We provide a class of triangular maps of the square, (x, y) -> (f(x), g(x)(y)) of type 2(infinity), i.e., such that the periods of periodic points are the powers of 2, which has a minimal set supporting positive topological entropy. This improves the famous example by S. Kolyada from 1992 and contributes to the solution of an old problem by A.N. Sharkovsky."@en . . "19610" . "A triangular map of type $2^{\\infty}$ with positive topological entropy on a minimal set"@en . "Nonlinear Analysis: Theory, Methods & Applications" . "We provide a class of triangular maps of the square, (x, y) -> (f(x), g(x)(y)) of type 2(infinity), i.e., such that the periods of periodic points are the powers of 2, which has a minimal set supporting positive topological entropy. This improves the famous example by S. Kolyada from 1992 and contributes to the solution of an old problem by A.N. Sharkovsky." . .