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vorderings

Vorderings, often referred to simply as orderings in mathematical literature, are binary relations that compare elements of a set in a way that imposes a notion of "before" or "larger than." In many contexts, especially algebra, orderings are required to be compatible with the algebraic structure, producing what are called left-orderings, right-orderings, or bi-orderings on groups.

Formally, a left-ordering on a group G is a total order ≤ on G with the property that

Examples include the additive group of real numbers with the usual order, which is both left- and

Properties and consequences vary by context, but common themes include the ability to compare elements consistently,

See also: ordered group, left-orderable group, right-ordering, bi-ordering, positive cone, Dehornoy order.

a
≤
b
implies
ca
≤
cb
for
all
a,b,c
in
G.
In
other
words,
left
multiplication
preserves
the
order.
A
right-ordering
requires
preservation
under
multiplication
on
the
right,
and
a
bi-ordering
requires
preservation
on
both
sides.
Equivalently,
these
orders
can
be
described
via
positive
cones:
the
set
P
=
{g
in
G
:
e
<
g}
is
a
semigroup
(closed
under
multiplication)
and
G
is
the
disjoint
union
of
P,
P^{-1},
and
{e}.
The
existence
of
such
a
positive
cone
characterizes
left-orderability.
right-invariant.
Free
groups
are
left-orderable,
and
braid
groups
admit
left-invariant
orders
(notably
the
Dehornoy
order).
Lexicographic
and
other
concrete
orders
can
yield
invariant
orders
on
direct
products
of
groups.
to
study
dynamics
of
group
actions
on
ordered
spaces,
and
to
investigate
structural
features
such
as
torsion-freeness
and
archimedean
properties.
Well-orderings
can
be
considered
in
related
contexts,
though
compatibility
with
group
operations
is
not
automatic
and
may
require
the
axiom
of
choice.