-
equivalence relation whose equivalence classes are
called conjugacy classes. In
other words, each
conjugacy class is
closed under b=gag−1{\displaystyle b=gag^{-1}}...
-
homeomorphism that will
conjugate the one into the other.
Topological conjugacy, and related-but-distinct § Topological
equivalence of flows, are important...
- radians.
Vertices in the same
polyhedron are in the same
conjugacy class.
Since the
conjugacy class equation for A5 is 1 + 12 + 12 + 15 + 20 = 60, we obtain...
- mathematics, in the
field of
group theory, a
subgroup of a
group is said to be
conjugacy-closed if any two
elements of the
subgroup that are
conjugate in the group...
- In mathematics, the
complex conjugate of a
complex number is the
number with an
equal real part and an
imaginary part
equal in
magnitude but
opposite in...
-
Isbell conjugacy,
Isbell duality, or
Isbell adjunction (named
after John R. Isbell) is a
fundamental construction of
enriched category theory formally...
- In
abstract algebra, the
conjugacy problem for a
group G with a
given presentation is the
decision problem of determining,
given two
words x and y in...
- In
abstract algebra, a
conjugacy class sum, or
simply class sum, is a
function defined for each
conjugacy class of a
finite group G as the sum of the elements...
- as
conjugacy, and
similar matrices are also
called conjugate; however, in a
given subgroup H of the
general linear group, the
notion of
conjugacy may...
- mathematics, a
group is said to have the
infinite conjugacy class property, or to be an ICC group, if the
conjugacy class of
every group element but the identity...