- (the
Sierpiński triangle, the
Sierpiński ****, and the
Sierpiński curve), as are
Sierpiński numbers and the ****ociated
Sierpiński problem.
Sierpiński was...
- The
Sierpiński triangle, also
called the
Sierpiński gasket or
Sierpiński sieve, is a
fractal with the
overall shape of an
equilateral triangle, subdivided...
- The
Sierpiński **** is a
plane fractal first described by Wacław
Sierpiński in 1916. The **** is a
generalization of the
Cantor set to two dimensions;...
-
sponge (also
known as the
Menger cube,
Menger universal curve,
Sierpinski cube, or
Sierpinski sponge) is a
fractal curve. It is a three-dimensional generalization...
- In
number theory, a
Sierpiński number is an odd
natural number k such that k × 2 n + 1 {\displaystyle k\times 2^{n}+1} is
composite for all
natural numbers...
- In mathematics, the
Sierpiński space is a
finite topological space with two points, only one of
which is closed. It is the
smallest example of a topological...
-
Sierpiński curves are a
recursively defined sequence of
continuous closed plane fractal curves discovered by Wacław
Sierpiński,
which in the
limit n →...
- In mathematics, a
Sierpiński set is an
uncountable subset of a real
vector space whose intersection with
every measure-zero set is countable. The existence...
-
result in the
Sierpinski triangle,
while creating the
proper arrangement with four
points and a
factor 1/2 will
create a
display of a "
Sierpinski Tetrahedron"...
-
Sierpiński's constant is a
mathematical constant usually denoted as K. One way of
defining it is as the
following limit: K = lim n → ∞ [ ∑ k = 1 n r 2...
