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In homological algebra, the Bockstein homomorphism, introduced by Meyer Bockstein (1942, 1943, 1958), is a connecting homomorphism associated with a short exact sequence

0\to P\to Q\to R\to 0

of abelian groups, when they are introduced as coefficients into a chain complex C, and which appears in the homology groups as a homomorphism reducing degree by one,

\beta \colon H_{i}(C,R)\to H_{i-1}(C,P).

To be more precise, C should be a complex of free, or at least torsion-free, abelian groups, and the homology is of the complexes formed by tensor product with C (some flat module condition should enter). The construction of β is by the usual argument (snake lemma).

A similar construction applies to cohomology groups, this time increasing degree by one. Thus we have

\beta \colon H^{i}(C,R)\to H^{i+1}(C,P).

The Bockstein homomorphism $\beta$ associated to the coefficient sequence

0\to \mathbb {Z} /p\mathbb {Z} \to \mathbb {Z} /p^{2}\mathbb {Z} \to \mathbb {Z} /p\mathbb {Z} \to 0

is used as one of the generators of the Steenrod algebra. This Bockstein homomorphism has the following two properties:

\beta \beta =0

,

\beta (a\cup b)=\beta (a)\cup b+(-1)^{\dim a}a\cup \beta (b)

;

in other words, it is a superderivation acting on the cohomology mod p of a space.

References

Bockstein, Meyer (1942), "Universal systems of ∇-homology rings", C. R. (Doklady) Acad. Sci. URSS, New Series, 37: 243–245, MR 0008701
Bockstein, Meyer (1943), "A complete system of fields of coefficients for the ∇-homological dimension", C. R. (Doklady) Acad. Sci. URSS, New Series, 38: 187–189, MR 0009115
Bockstein, Meyer (1958), "Sur la formule des coefficients universels pour les groupes d'homologie", Comptes Rendus de l'Académie des Sciences, Série I, 247: 396–398, MR 0103918
Hatcher, Allen (2002), Algebraic Topology, Cambridge University Press, ISBN 978-0-521-79540-1, MR 1867354.
Spanier, Edwin H. (1981), Algebraic topology. Corrected reprint, New York-Berlin: Springer-Verlag, pp. xvi+528, ISBN 0-387-90646-0, MR 0666554

@@ Line 1: / Line 1: @@
+{{Short description|Homological map}}
-In [[mathematics]], the '''Bockstein homomorphism''' in [[homological algebra]] is a [[connecting homomorphism]] associated with a [[short exact sequence]]
+In  [[homological algebra]], the '''Bockstein homomorphism''', introduced by {{harvs|txt|authorlink=Meyer Bockstein|last=Bockstein|first=Meyer |year1=1942|year2=1943|year3=1958}}, is a [[connecting homomorphism]] associated with a [[short exact sequence]]
-:0 &rarr; P &rarr; Q &rarr; R &rarr; 0
+:<math>0 \to P \to Q \to R \to 0</math>
-of [[abelian group]]s, when they are introduced as coefficients into a [[chain complex]] ''C'', and which appears in the [[homology]] groups as a homomorphism reducing degree by one,
+of [[abelian group]]s, when they are introduced as coefficients into a [[chain complex]] ''C'', and which appears in the [[Homology (mathematics)|homology]] groups as a homomorphism reducing degree by one,
+:<math>\beta\colon H_i(C, R) \to H_{i-1}(C,P).</math>
-:&beta;: ''H''<sub>''i''</sub>(''C'', ''R'') &rarr; ''H''<sub>''i'' &minus; 1</sub>(''C'', ''P'').
-To be more precise, ''C'' should be a complex of [[free abelian group]]s, or at least [[torsion free]], and the homology is of the complexes formed by [[tensor product]] with ''C'' (some [[flat module]] condition should enter). The construction of &beta; is by the usual argument ([[snake lemma]]).
+To be more precise, ''C'' should be a complex of [[free abelian group|free]], or at least [[torsion-free abelian group|torsion-free]], abelian groups, and the homology is of the complexes formed by [[tensor product]] with ''C'' (some [[flat module]] condition should enter). The construction of β is by the usual argument ([[Zig-zag lemma|snake lemma]]).
 A similar construction applies to [[cohomology group]]s, this time increasing degree by one. Thus we have
-:&beta;: ''H''<sup>''i''</sup>(''C'', ''R'') &rarr; ''H''<sup>''i'' + 1</sup>(''C'', ''P'').
+:<math>\beta\colon H^i(C, R) \to H^{i+1}(C,P).</math>
+The Bockstein homomorphism <math>\beta</math> associated to the coefficient sequence
-This is important as a [[cohomology operation]] (see [[Steenrod algebra]]).
+:<math>0 \to \Z/p\Z\to \Z/p^2\Z\to \Z/p\Z\to  0</math>
+is used as one of the generators of the  [[Steenrod algebra]]. This Bockstein homomorphism has the following two properties:
+:<math>\beta\beta = 0</math>,
+:<math>\beta(a\cup b) = \beta(a)\cup b + (-1)^{\dim a} a\cup \beta(b)</math>;
+in other words, it is a superderivation acting on the cohomology mod ''p'' of a space.
-==Reference==
+== See also ==
+*[[Bockstein spectral sequence]]
+==References==
-*Edwin Spanier, ''Algebraic Topology''
+*{{Citation | last1=Bockstein | first1=Meyer |authorlink=Meyer Bockstein| title=Universal systems of ∇-homology rings | mr=0008701 | year=1942 | journal=C. R. (Doklady) Acad. Sci. URSS |series=New Series | volume=37 | pages=243–245}}
+*{{Citation | last1=Bockstein | first1=Meyer |authorlink=Meyer Bockstein| title=A complete system of fields of coefficients for the ∇-homological dimension | mr=0009115 | year=1943 | journal=C. R. (Doklady) Acad. Sci. URSS |series=New Series | volume=38 | pages=187–189}}
+* {{citation
+ |last= Bockstein
+ |first= Meyer
+ |title= Sur la formule des coefficients universels pour les groupes d'homologie
+ |journal=[[Comptes rendus de l'Académie des Sciences|Comptes Rendus de l'Académie des Sciences, Série I]]
+ |volume= 247
+ |year= 1958
+ |pages= 396–398
+ |url=
+ |doi=
+ |mr= 0103918
+ }}
+* {{citation
+ |first= Allen
+ |last= Hatcher
+ |author-link= Allen Hatcher
+ |title= Algebraic Topology
+ |url= http://www.math.cornell.edu/%7Ehatcher/AT/ATpage.html
+ |year= 2002
+ |publisher= [[Cambridge University Press]]
+ |isbn= 978-0-521-79540-1
+ |mr= 1867354
+ }}.
+*{{citation|mr=0666554|last= Spanier|first= Edwin H.|author-link=Edwin Spanier| title= Algebraic topology. Corrected reprint |publisher=[[Springer-Verlag]]|publication-place= New York-Berlin|year= 1981|pages= xvi+528| isbn= 0-387-90646-0}}
 [[Category:Algebraic topology]]