Let α :Q→ Q be an involution of a Hilbert cube with fixed point set Qα that has Property Z in Q.The first main result of this paper is Theorem 3.1: Assume that (Q,α) is an absolute retract in the category of metric spaces with involutions and equivariant maps. If T? Q is an equivariant retract of Q containing Qα that is an inequivariant Z-set in Q, then for any equivariant retraction r:Q→ T, Q is equivariantly homeomorphic with the mapping cylinder M(r;T) of r reduced at T. The second main result is part of Theorem 3.3: Qα is an equivariant strong deformation retract of Q if and only if Q is equivariantly homeomorphic with Qα× Πi≧1Ii equipped with the involution that reflects each interval coordinate Ii across its mid-point.
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