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bn

Bn is a notation used in several disciplines to denote different objects, so there is no single universal meaning. The exact interpretation depends on context, and in many texts the meaning is clarified by surrounding symbols or by the field of study.

In mathematics, Bn commonly denotes multiple distinct structures. The braid group on n strands, Bn, is a

Beyond these, Bn or related forms appear in other mathematical contexts, such as different notational conventions

In practical use, when encountering Bn or B^n, readers should consult the definition supplied in the relevant

fundamental
object
in
geometric
and
algebraic
topology.
It
is
generated
by
elementary
braids
with
relations
that
encode
how
strands
interact.
The
hyperoctahedral
group
of
type
Bn,
often
called
the
group
of
signed
permutations,
is
the
symmetry
group
of
the
n-dimensional
cube
and
has
order
2^n
n!.
In
combinatorics,
Bn
denotes
the
nth
Bell
number,
which
counts
the
number
of
partitions
of
an
n-element
set.
In
topology
and
analysis,
B^n
is
the
standard
notation
for
the
n-dimensional
unit
ball,
consisting
of
all
points
in
R^n
with
norm
at
most
1;
its
boundary
is
the
(n−1)-sphere
S^{n−1}.
for
groups,
Coxeter
systems,
or
sequences.
The
precise
meaning
is
typically
inferred
from
the
surrounding
notation
and
the
field
of
study.
text
to
determine
which
object
is
being
referenced.
The
distinction
between
subscript
Bn
and
superscript
B^n
is
often
crucial,
as
they
denote
different
families
of
objects
in
the
same
general
area.