Exact sequence for double mapping cylinder

This article defines a long exact sequence of homology groups, for topological spaces or pairs of topological spaces

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Definition

Let ${\displaystyle X,Y,Z}$ be topological spaces and ${\displaystyle f:X\to Y,g:X\to Z}$ be continuous maps. Let ${\displaystyle D}$ be the double mapping cylinder of ${\displaystyle f}$ and ${\displaystyle g}$. Let ${\displaystyle i,j}$ denote the inclusions of ${\displaystyle Y}$ and ${\displaystyle Z}$ in ${\displaystyle D}$. Then we have the following long exact sequence of homology:

${\displaystyle \ldots \to H_{q}(X)\to H_{q}(Y)\oplus H_{q}(Z)\to H_{q}(D)\to H_{q-1}(X)\to \ldots }$

where the maps are:

${\displaystyle a\in H_{q}(X)\mapsto (H_{q}(f)a,-H_{q}(g)a)}$

and:

${\displaystyle (b,c)\in H_{q}(Y)\oplus H_{q}(Z)\mapsto H_{q}(i)b+H_{q}(j)c}$

And the third map is the usual connecting homomorphism from Mayer-Vietoris.

We can replace homology with reduced homology above.