- crystallography, and for work in topology.
Schoenflies was born in
Landsberg an der
Warthe (modern Gorzów, Poland).
Arthur Schoenflies married Emma
Levin (1868–1939)...
- mathematics, the
Schoenflies problem or
Schoenflies theorem, of
geometric topology is a
sharpening of the
Jordan curve theorem by
Arthur Schoenflies. For Jordan...
- The
Schoenflies (or Schönflies) notation,
named after the
German mathematician Arthur Moritz Schoenflies, is a
notation primarily used to
specify point...
-
Schoenflies (or Schönflies)
displacement (or motion)
named after Arthur Moritz Schoenflies is a
rigid body
motion consisting of
linear motion in three...
-
lists the
groups by
Schoenflies notation,
Coxeter notation,
orbifold notation, and order. John
Conway uses a
variation of the
Schoenflies notation, based...
- non-crystallographic
icosahedral groups (I and Ih in
Schoenflies notation) and two
limit groups (K and Kh in
Schoenflies notation). The Hermann–Mauguin
symbols were...
- the
correspondence of the two
systems below, see
crystal system. In
Schoenflies notation,
point groups are
denoted by a
letter symbol with a subscript...
- below,
followed by
their representations in
international notation,
Schoenflies notation,
orbifold notation,
Coxeter notation and
mineral examples. There...
-
question contains both a 41 **** axis as well as a
glide plane along a. In
Schoenflies notation, the
symbol of a
space group is
represented by the
symbol of...
-
Traditional knots form the case
where N = S1 and M = R3 or M = S3. The
Schoenflies theorem states that the
circle does not knot in the 2-sphere:
every topological...
