- {\displaystyle (X,\Sigma )} is
called a
measurable space, and the
members of Σ {\displaystyle \Sigma } are
called measurable sets. A
triple ( X , Σ , μ ) {\displaystyle...
- and in
particular measure theory, a
measurable function is a
function between the
underlying sets of two
measurable spaces that
preserves the structure...
- be ****igned a
Lebesgue measure are
called Lebesgue-
measurable; the
measure of the Lebesgue-
measurable set A is here
denoted by λ(A).
Henri Lebesgue described...
- Bochner-
measurable function taking values in a
Banach space is a
function that
equals almost everywhere the
limit of a
sequence of
measurable countably-valued...
- In mathematics, a non-
measurable set is a set
which cannot be ****igned a
meaningful "volume". The
mathematical existence of such sets is
construed to provide...
- In mathematics, a
measurable space or
Borel space is a
basic object in
measure theory. It
consists of a set and a σ-algebra,
which defines the subsets...
- is an
elementary example of a set of real
numbers that is not
Lebesgue measurable,
found by
Giuseppe Vitali in 1905. The
Vitali theorem is the existence...
- A{\displaystyle A} of a
Polish space X{\displaystyle X} is
universally measurable if it is
measurable with
respect to
every complete probability measure on X{\displaystyle...
- Review',
where he
advocated for
setting objectives that are Specific,
Measurable, ****ignable, Realistic, and Time-bound—hence the
acronym S.M.A.R.T. Since...
-
product sigma-algebra of
measurable spaces is
defined to be the
finest such that the
projection mappings will be
measurable.
Sometimes for some reasons...