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partitionable

Partitionable is a mathematical adjective used to describe objects that can be divided into parts that satisfy a prescribed property. Broadly, the concept relies on partitions: a partition of a set X is a collection of nonempty, pairwise disjoint subsets whose union is X. An object is partitionable with respect to a property P if there exists a partition of its underlying set into parts, each of which has property P.

In practice, the exact meaning of partitionable depends on the field and the property P being considered.

Notes and caveats: partitionability is not a single, universal technical term with one fixed definition. Instead,

See also: partition of a set, bipartite graphs, partition of unity, measurable partition.

For
sets,
any
set
is
partitionable
into
singletons,
which
is
a
trivial
partition.
In
graph
theory,
a
key
example
is
bipartite
graphs:
a
graph
is
bipartite
precisely
when
its
vertex
set
can
be
partitioned
into
two
independent
sets.
In
measure
theory
or
probability,
a
measurable
space
may
be
described
as
partitionable
into
measurable
atoms
or
blocks
that
partition
the
space
and,
for
instance,
carry
prescribed
measures
or
probabilities.
In
topology
and
geometry,
partitionability
can
refer
to
decompositions
into
pieces
that
satisfy
local
properties
or
to
structured
covers
related
to
partitions
of
unity,
though
usage
varies
by
context.
it
denotes
the
existence
of
a
partition
meeting
the
specified
condition,
and
authors
may
emphasize
different
kinds
of
partitions
(finite
or
infinite,
coarse
or
refined)
depending
on
the
problem.