On projections and limit mappings of inverse systems of compact spaces

Eilenberg proved that if a compact space X admits a zero-dimensional map f :X → Y , where Y is m-dimensional, then there exists a map h :X → I m+1 such that f × h :X → Y × I m+1 is an embedding. In this paper we prove generalizations of this result for σ -compact subsets of arbitrary spaces. An exam

There are uncountably many distinct inverse limit spaces that can be formed with unimodal maps as bonding maps. 0 1998 Elsevier Science B.V.

For an arbitrary C r unimodal map f , its inverse limit space X is embedded in a planar region W in such a way that the induced homeomorphism f : X → X conjugates to a Lipschitz map g : A ⊂ W → A. Furthermore g can be extended, in a C r manner, to the rest of W . In the course of the proof a charact

Let I be a closed interval and f : I -I be continuous. We investigate the structure of the inverse limit space lim{l. j'} which contains no indecomposable subcontinuum. In particular, we show that the set of nondegenerate maximal nowhere dense subcontinua of lim{l, f} is finite if f is piecewise mon