Kan-Thurston theorem

Let ${\displaystyle X}$  be a path-connected topological space. Then, naturally associated to ${\displaystyle X}$ , there is a Serre fibration ${\displaystyle t_{x}\colon T_{X}\to X}$  where ${\displaystyle T_{X}}$  is an aspherical space. Furthermore,

• the induced map ${\displaystyle \pi _{1}(T_{X})\to \pi _{1}(X)}$  is surjective, and
• for every local coefficient system ${\displaystyle A}$  on ${\displaystyle X}$ , the maps ${\displaystyle H_{*}(TX;A)\to H_{*}(X;A)}$  and ${\displaystyle H^{*}(TX;A)\to H^{*}(X;A)}$  induced by ${\displaystyle t_{x}}$  are isomorphisms.

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