Torsion-free abelian group

In mathematics, specifically in abstract algebra, a torsion-free abelian group is an abelian group which has no non-trivial torsion elements; that is, a group in which the group operation is commutative and the identity element is the only element with finite order. That is, multiples of any element other than the identity element generate an infinite number of distinct elements of the group.

Definitions

Main article: Abelian group

An abelian group $\langle G,*\rangle$ is a set G, together with a binary operation * on G, such that the following axioms are satisfied:

Associativity: For all a, b and c in G, (a * b) *c = a * (b * c).
Identity element: There is an element e in G, such that e * x = x * e = x for all x in G. This element e is an identity element for * on G.
Inverse element: For each a in G, there is an element a′ in G with the property that a′ * a = a * a′ = e. The element a′ is an inverse of a with respect to *.
Commutativity: For all a, b in G, a * b = b * a.^[1]^[2]^[3]

Main article: Order (group theory)

Order: For this definition, note that in an abelian group, the binary operation is usually called addition, the symbol for addition is “+”^[4] and a repeated sum, $a+a+\cdots +a$ of the same element appearing n times is usually abbreviated “na”.^[5] Let G be a group and a ∈ G. If there is a positive integer n such that na = e, the least such positive integer n is the order of a. If no such n exists, then a is of infinite order.^[6]^[7]^[8]

Main article: Torsion (algebra)

Torsion: A group G is a torsion group if every element in G is of finite order. G is torsion free if no element other than the identity is of finite order.^[9]^[10]^[11]

Properties

A torsion-free abelian group has no non-trivial finite subgroups.
A finitely generated torsion-free abelian group is free.^[12]

Notes

↑ Fraleigh (1976, pp. 18−20)
↑ Herstein (1964, pp. 26−27)
↑ McCoy (1968, pp. 143−146)
↑ Fraleigh (1976, p. 27)
↑ Fraleigh (1976, p. 30)
↑ Fraleigh (1976, pp. 50,72)
↑ Herstein (1964, p. 37)
↑ McCoy (1968, p. 166)
↑ Fraleigh (1976, p. 78)
↑ Lang (2002, p. 42)
↑ Hungerford (1974, p. 78)
↑ Lang (2002, p. 45)

References

Fraleigh, John B. (1976), A First Course In Abstract Algebra (2nd ed.), Reading: Addison-Wesley, ISBN 0-201-01984-1
Herstein, I. N. (1964), Topics In Algebra, Waltham: Blaisdell Publishing Company, ISBN 978-1114541016
Hungerford, Thomas W. (1974), Algebra, New York: Springer-Verlag, ISBN 0-387-90518-9 .
Lang, Serge (2002), Algebra (Revised 3rd ed.), New York: Springer-Verlag, ISBN 0-387-95385-X .
McCoy, Neal H. (1968), Introduction To Modern Algebra, Revised Edition, Boston: Allyn and Bacon, LCCN 68-15225

Groups

Basic notions	Subgroup Normal subgroup Commutator subgroup Quotient group Group homomorphism (Semi-)direct product direct sum

Types of groups	Finite groups Abelian groups Cyclic groups Infinite group Simple groups Solvable groups Symmetry group Space group Point group Wallpaper group Trivial group

Discrete groups	Classification of finite simple groups Cyclic group Z_n Alternating group A_n Sporadic groups Mathieu group M_11..12,M_22..24 Conway group Co_1..3 Janko groups J₁, J₂, J₃, J₄ Fischer group F_22..24 Baby Monster group B Monster group M Other finite groups Symmetric group S_n Dihedral group D_n Rubik's cube group

Lie groups	General linear group GL(n) Special linear group SL(n) Orthogonal group O(n) Special orthogonal group SO(n) Unitary group U(n) Special unitary group SU(n) Symplectic group Sp(n) Exceptional Lie groups G₂ F₄ E₆ E₇ E₈ Circle group Lorentz group Poincaré group Quaternion group

Infinite dimensional groups	Conformal group Diffeomorphism group Loop group Quantum group O(∞) SU(∞) Sp(∞)

History Applications Abstract algebra

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Torsion-free abelian group

Definitions

Properties

See also

Notes

References