The ring of stable homotopy classes of self-maps of An2-polyhedra
Abstract
We raise the problem of realisability of rings as \X,X\ the ring of stable homotopy classes of self-maps of a space X. By focusing on An2-polyhedra, we show that the direct sum of three endomorphism rings of abelian groups, one of which must be free, is realisable as \X,X\ modulo the acyclic maps. We also show that Fp3 is not realisable in the setting of finite type An2-polyhedra, for p any prime.
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