an:01546931
Zbl 0964.55017
Schwede, Stefan
Stable homotopy of algebraic theories
EN
Topology 40, No. 1, 1-41 (2001).
00070296
2001
j
55U35 18C10
algebraic theory; Andr??-Quillen homology; ring spectrum; simplicial theory; stable homotopy theory; topological Hochschild homology
By [the author, J. Pure Appl. Algebra 120, No. 1, 77-104 (1997; Zbl 0888.55010)] the stable homotopy theory of commutative simplicial algebras over a \(\mathbb{Q}\)-algebra \(B\) is equivalent to the homotopy theory of simplicial \(B\)-modules.
The paper shows that the stable homotopy theory of an algebraic theory is completely determined by an associated ring spectrum. For the theory of commutative algebras this ring spectrum is related to Andr??-Quillen homology via some spectral sequences. An equivalence of the (co-)homology of an algebraic theory with the topological Hochschild (co-)homology of the associated ring spectrum is established.
Marek Golasi??ski (Toru??)
Zbl 0888.55010