The Lelek fan as the inverse limit of intervals with a single set-valued bonding function whose graph is an arc

Abstract

We consider a family of inverse limits of inverse sequences of closed unit intervals with a single upper semi-continuous set-valued bonding function whose graph is an arc; it is the union of two line segments in [0,1]2, both of them contain the origin (0, 0), have positive slope, and extend to the opposite boundary of [0,1]2. We show that there is a large subfamily F of these bonding functions such that for each f∈ F, the inverse limit of the inverse sequence of closed unit intervals using f as a single bonding function, is homeomorphic to the Lelek fan.

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