2018
DOI: 10.1007/s00009-018-1209-6
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The (Weak) Full Projection Property for Inverse Limits with Upper Semicontinuous Bonding Functions

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Cited by 5 publications
(13 citation statements)
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“…It is easy to see that f i is indecomposable, f −1 i is continuous, and A (f i ) is dense in G(f i ). Also, by [ Next, we deal with topics in [2]. In [2], Banič,Črepnjak, Merhar, and Milutinovič gave some results about the full projection property, the weak full projection property (see [2,Definition 5]), and the inverse limit property (see Definition 6.9).…”
Section: Theorem 63 Letmentioning
confidence: 99%
See 3 more Smart Citations
“…It is easy to see that f i is indecomposable, f −1 i is continuous, and A (f i ) is dense in G(f i ). Also, by [ Next, we deal with topics in [2]. In [2], Banič,Črepnjak, Merhar, and Milutinovič gave some results about the full projection property, the weak full projection property (see [2,Definition 5]), and the inverse limit property (see Definition 6.9).…”
Section: Theorem 63 Letmentioning
confidence: 99%
“…Also, by [ Next, we deal with topics in [2]. In [2], Banič,Črepnjak, Merhar, and Milutinovič gave some results about the full projection property, the weak full projection property (see [2,Definition 5]), and the inverse limit property (see Definition 6.9). Also, in [2], they posed some problems with respect to the (weak) full projection property and the inverse limit property.…”
Section: Theorem 63 Letmentioning
confidence: 99%
See 2 more Smart Citations
“…Of course, inverse limits of spaces are nothing but categorical limits in the category Top of topological spaces and continuous mappings, and it is natural to ask whether the slogan generalises. Results addressing some categorical aspects of generalised inverse limits directly can be found in [4,26], but they were only partially successful in fully restoring the link with category theory, and the difficulty can be traced to the following phenomenon. Consider the functor T : Top → Top which maps a space X to T (X), the space of all subsets of X, endowed with the upper Vietoris topology.…”
Section: Introductionmentioning
confidence: 99%