This work is licensed under the Creative Commons Attribution 4.0 International License.
Kuratovski K. (1968) Topology, vol.2 (New York: Academic Press).KuratovskiK.1968Topology2New YorkAcademic PressSearch in Google Scholar
Nadler S. B. (1992) Continuum Theory: An Introduction (Monographs and Textbooks in Pure and Applied Mathematics, 158). Marcel Dekker, New York.NadlerS. B.1992Continuum Theory: An Introduction (Monographs and Textbooks in Pure and Applied Mathematics, 158)Marcel DekkerNew YorkSearch in Google Scholar
Naghmouchi I. (2011) Dynamics of monotone graph, dendrite and dendroid maps International Journal of Bifurcation & Chaos21 3205–3215.NaghmouchiI.2011Dynamics of monotone graph, dendrite and dendroid mapsInternational Journal of Bifurcation & Chaos213205321510.1142/S0218127411030465Search in Google Scholar
Makhrova E. N., Vaniukova K. S. (2016 ) On the set of non-wandering of monotone maps on local dendrites Journal of Physics: Conference Series692, 012012.MakhrovaE. N.VaniukovaK. S.2016On the set of non-wandering of monotone maps on local dendritesJournal of Physics: Conference Series69201201210.1088/1742-6596/692/1/012012Search in Google Scholar
Naghmouchi I. (2012) Dynamical properties of monotone dendrite maps Topology and its Applications159 144–149.NaghmouchiI.2012Dynamical properties of monotone dendrite mapsTopology and its Applications15914414910.1016/j.topol.2011.08.020Search in Google Scholar
Balibrea F., García Guirao J.L., Muñoz Casado J.I. (2001) Description of ω-limit sets of a triangular map on I2Far East J. Dyn. Syst.3 87–101.BalibreaF.García GuiraoJ.L.Muñoz CasadoJ.I.2001Description of ω-limit sets of a triangular map on I2Far East J. Dyn. Syst.387101Search in Google Scholar
Balibrea F., García Guirao J.L., Muñoz Casado J.I. (2002) A triangular map on I2 whose ω-limit sets are all compact interval of 0 × I Discrete Contin. Dyn. Syst.8 983–994.BalibreaF.García GuiraoJ.L.Muñoz CasadoJ.I.2002A triangular map on I2 whose ω-limit sets are all compact interval of 0 × IDiscrete Contin. Dyn. Syst.898399410.3934/dcds.2002.8.983Search in Google Scholar
Efremova L.S. (2017) Dynamics of skew products of interval maps Russian Math. Surveys72 101–178.EfremovaL.S.2017Dynamics of skew products of interval mapsRussian Math. Surveys7210117810.1070/RM9745Search in Google Scholar
Efremova L. S. (2010) Differential properties and attracting sets of a simplest skew product of interval maps Sb. Math.201 873–907.EfremovaL. S.2010Differential properties and attracting sets of a simplest skew product of interval mapsSb. Math.20187390710.1070/SM2010v201n06ABEH004095Search in Google Scholar
Kočen Z. (1999) The problem of classification of triangular maps with zero topological entropy Ann. Math. Sil.13 181–192.KočenZ.1999The problem of classification of triangular maps with zero topological entropyAnn. Math. Sil.13181192Search in Google Scholar
Kolyada S.F. (1992) On dynamics of triangular maps of the square Ergodic Theory Dynam. Systems12 749–768.KolyadaS.F.1992On dynamics of triangular maps of the squareErgodic Theory Dynam. Systems1274976810.1017/S0143385700007082Search in Google Scholar
Buescu J., Stewart I. (1995) Liapunov stability and adding machines Ergodic Theory and Dynamical Systems15 271–290.BuescuJ.StewartI.1995Liapunov stability and adding machinesErgodic Theory and Dynamical Systems1527129010.1007/978-3-0348-7421-2_2Search in Google Scholar
Block L., Keesling J. (2004) A characterization of adding machine maps Topology and its Applications140 151–161.BlockL.KeeslingJ.2004A characterization of adding machine mapsTopology and its Applications14015116110.1016/j.topol.2003.07.006Search in Google Scholar
