- In
topology and
related branches of mathematics, a
Hausdorff space (/ˈhaʊsdɔːrf/ HOWSS-dorf, /ˈhaʊzdɔːrf/ HOWZ-dorf),
separated space or T2
space is a...
-
Hausdorff dimension is a
measure of roughness, or more specifically,
fractal dimension, that was
introduced in 1918 by
mathematician Felix Hausdorff....
-
Hausdorff in Wiktionary, the free dictionary.
Hausdorff may
refer to: A
Hausdorff space, when used as an adjective, as in "the real line is
Hausdorff"...
- In mathematics, the
Hausdorff distance, or
Hausdorff metric, also
called Pompeiu–
Hausdorff distance,
measures how far two
subsets of a
metric space are...
-
disjoint closed sets of X have
disjoint open neighborhoods. A
normal Hausdorff space is also
called a T4 space.
These conditions are
examples of separation...
- In mathematics,
Hausdorff measure is a
generalization of the
traditional notions of area and
volume to non-integer dimensions,
specifically fractals and...
-
Felix Hausdorff (/ˈhaʊsdɔːrf/ HOWS-dorf, /ˈhaʊzdɔːrf/ HOWZ-dorf;
November 8, 1868 –
January 26, 1942) was a
German mathematician,
pseudonym Paul Mongré...
-
space into a
Hausdorff space is a homeomorphism. A
compact Hausdorff space is
normal and regular. If a
space X is
compact and
Hausdorff, then no finer...
- In mathematics, the Baker–Campbell–
Hausdorff formula gives the
value of Z{\displaystyle Z} that
solves the
equation eXeY=eZ{\displaystyle e^{X}e^{Y}=e^{Z}}...
- neighborhood. In
mathematical analysis locally compact spaces that are
Hausdorff are of
particular interest; they are
abbreviated as LCH spaces. Let X...