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Groups

In mathematics, a group is a set G equipped with a binary operation that combines any two elements to form another element of G, satisfying four axioms: closure, associativity, the existence of an identity element, and the existence of inverses. Formally, a group (G, ·) satisfies: for all a, b, c in G, a·(b·c) = (a·b)·c; there exists e in G with e·a = a·e = a for all a; and for every a in G there is b in G with a·b = b·a = e. The operation is often written multiplicatively or additively.

Common examples include the integers under addition (Z, +), the nonzero rationals under multiplication (Q*, ×), and

Subgroups and quotient groups: A subset H of G that is closed under the operation and contains

Morphisms: A group homomorphism f:G→H preserves the operation: f(a·b) = f(a)·f(b). Isomorphisms identify groups up to structure;

Group actions: A group can act on a set, yielding orbits and stabilizers; the Orbit-Stabilizer theorem relates

Applications span mathematics, physics, chemistry, and cryptography. The term group also appears in the social sciences

the
symmetric
group
S_n,
the
group
of
all
permutations
of
n
elements
under
composition.
A
cyclic
group
is
generated
by
a
single
element,
such
as
Z_n
under
addition.
the
identity
is
a
subgroup.
If
N
is
a
normal
subgroup
of
G,
the
quotient
G/N
carries
a
natural
group
structure.
In
finite
groups,
the
order
|G|
is
the
number
of
elements,
and
Lagrange’s
theorem
states
that
the
order
of
a
subgroup
divides
|G|.
automorphisms
are
isomorphisms
from
a
group
to
itself.
their
sizes.
Important
classes
include
abelian
groups,
finite
groups,
p-groups,
simple
groups,
and
Lie
groups.
to
denote
a
collection
of
individuals
and
their
interactions.