In stable homotopy theory, a ring spectrum is a spectrum E together with a multiplication map
- μ: E ∧ E → E
and a unit map
- η: S → E,
where S is the sphere spectrum. These maps have to satisfy associativity and unitality conditions up to homotopy, much in the same way as the multiplication of a ring is associative and unital. That is,
- μ (id ∧ μ) ~ μ (μ ∧ id)
and
- μ (id ∧ η) ~ id ~ μ(η ∧ id).
Examples of ring spectra include singular homology with coefficients in a ring, complex cobordism, K-theory, and Morava K-theory.
See also
References
- Adams, J. Frank (1974), Stable homotopy and generalised homology, Chicago Lectures in Mathematics, University of Chicago Press, ISBN 0-226-00523-2, MR 0402720
 | This abstract algebra-related article is a stub. You can help Misplaced Pages by expanding it. |