Steenrod operation
From HandWiki
The general name for the stable cohomology operations (cf. Cohomology operation) created by N.E. Steenrod for every prime number $p$. The first example is contained in . For $p=2$ this is the Steenrod square $Sq^i$, for $p>2$ the Steenrod reduced power $\mathcal{P}^i$. The operations $Sq^i$ multiplicatively generate the Steenrod algebra modulo 2, while the operations $\mathcal{P}^i$ together with the Bockstein homomorphism generate the Steenrod algebra modulo $p$.
References
| [1] | J.F. Adams, "Stable homotopy and generalized homology", Univ. Chicago Press (1974) pp. Part III, Chapt. 12 |
| [2] | N.E. Steenrod, "Products of cocycles and extensions of mappings" Ann. of Math., 48 (1947) pp. 290–320 |
| [3] | N.E. Steenrod, D.B.A. Epstein, "Cohomology operations", Princeton Univ. Press (1962) |
| [4] | R.M. Switzer, "Algebraic topology - homotopy and homology", Springer (1975) pp. Chapt. 18 |
| [5] | M.K. Tangora, "Cohomology operations and applications in homotopy theory", Harper & Row (1968) |
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