Endpoint-homogeneous fans
Abstract
A fan F is endpoint-homogeneous if for any two endpoints e,e' of F, there is a homeomorphism h: F → F such that h(e) = e'. We prove there are uncountably many distinct homeomorphism types of endpoint-homogeneous smooth fans. To do this, we associate to each such fan F a topological invariant, in the form of a characteristic subset EPG(F) ⊂eq [0,1] describing how the endpoints of F limit onto any given blade of F. We describe precisely all the uncountably many different X ⊂eq [0,1] that can arise as EPG(F) for some endpoint-homogeneous smooth fan F. We also prove the existence of 1n-homogeneous smooth fans for all n ≥ 5.
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