Suslin homology

In mathematics, the Suslin homology is a homology theory attached to algebraic varieties. It was proposed by Suslin in 1987, and developed by Suslin and Voevodsky (1996). It is sometimes called singular homology as it is analogous to the singular homology of topological spaces.

By definition, given an abelian group A and a scheme X of finite type over a field k, the theory is given by

H_i(X, A) = \operatorname{Tor}_i^\mathbb{Z}(C, A)

where C is a free graded abelian group whose degree n part is generated by integral subschemes of $\triangle^n \times X$ , where $\triangle^n$ is an n-simplex, that are finite and surjective over $\triangle^n$ .

References

Geisser, Thomas (2009), On Suslin’s singular homology and cohomology, arXiv:0912.1168
Levine, Marc (1997), "Homology of algebraic varieties: an introduction to the works of Suslin and Voevodsky", Bull. Amer. Math. Soc. (N.S.) 34 (3): 293–312, MR 1432056
Suslin, Andrei; Voevodsky, Vladimir (1996), "Singular homology of abstract algebraic varieties", Invent. Math. 123 (1): 61–94, MR 1376246

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