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References
Bing R.H., Partitioning continuous curves, Bull.AMS, 58 (1952), 536–556.
Curtis D.W., Hyperspaces of Peano continua, Math.Centre Tracts, 115 (1979), 51–65.
Curtis D.W. and Schori R.M., 2x and C(X) are homeomorphic to the Hilbert cube, Bull.AMS, 80 (1974), 927–931.
Curtis D.W. and Schori R.M., Hyperspaces which characterize simple homotopy type, Genr.Top. and Applic., 6 (1976), 153–165.
Curtis D.W. and Schori R.M., Hyperspaces of polyhedra are Hilbert cubes, Fund.Math., 99 (1978), 189–197.
Curtis D.W. and Schori R.M., Hyperspaces of Peano continua are Hilbert cubes, Fund.Math., 101 (1978), 19–38.
Fedorchuk V.V., Covariant functors in the category of compacta, absolute retracts, and Q-manifolds, Uspekhi Mat Nauk, 36:3 (1981), 177–195.
Fedorchuk V.V., Exponentials of Peano continua — fibre version, Dokl. AN SSSR, 262 (1982), 41–44.
Fedorchuk V.V., On open maps Uspechi Mat.Nauk, 37:4 (1982), 187–188.
Kelley J.L., Hyperspaces of a continuum, Trans, AMS, 52 (1942), 22–36.
Michael E., Continuous selections I, Ann.Math., 63 (1956), 361–382.
Michael E., Continuous selections II, Ann.Math., 64 (1956), 562–580.
van Mill J. and Wattel E., Dendrons, Math. Centre Tracts, 142 (1981), 59–81.
Pelczynski A., Linear extensions, linear averagings, and their applications to linear topological classification of spaces of continuous functions, Dissert.Math., Warszawa, 1968, 1–144.
Schori R.M., and West J.E., 2I is homeomorphic to the Hilbert cube Bull.Ams, 78 (1972), 402–406.
Schori R.M. and West J.E., Hyperspaces of graphs are Hilbert cubes, Pacific J.Math., 53 (1974), 239–251.
Schori R.M. and West J.E., The hyperspace of the closed unit interval is a Hilbert cube, Trans AMS, 213 (1975), 217–235.
Torunczyk H. and West J.E., Fibrations VS bundles in Hilbert cube manifolds, 1980 (preprint).
Vietoris L., Kontinua zweiter Ordnung, Monatschefte für Math. und Phys., 33 (1923), 49–62.
Wazewski T., Sur un continu singulier, Fund.Math., 4 (1923), 214–235.
West J.E., The subcontinua of a dendron form a Hilbert cube factor, Proc.AMS, 36 (1972), 603–608.
Wojdyslawski M., Retractes absolus het hyperspaces des continus, Fund.Math., 32 (1939), 184–192.
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© 1984 Springer-Verlag
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Fedorchuk, V.V. (1984). On hypermaps, which are trivial bundles. In: Faddeev, L.D., Mal’cev, A.A. (eds) Topology. Lecture Notes in Mathematics, vol 1060. Springer, Berlin, Heidelberg. https://doi.org/10.1007/BFb0099918
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DOI: https://doi.org/10.1007/BFb0099918
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