Examples of 'sierpiński' in a sentence
Meaning of "sierpiński"
sierpiński (noun) - Refers to the Sierpiński triangle, a fractal shape named after the Polish mathematician Wacław Sierpiński. In English, it is used in mathematical contexts to describe a specific geometric pattern
How to use "sierpiński" in a sentence
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sierpiński
Sierpiński maintained an output of research papers and books.
The canonical example is the Sierpiński triangle.
Sierpiński demonstrated that his carpet is a universal plane curve.
This is a discrete version of the Sierpiński triangle.
It is possible for a Sierpiński set to be a subgroup under addition.
The associated topological space is the Sierpiński space.
Most currently known Sierpiński numbers possess similar covering sets.
A topological space homeomorphic to one of these is called a Sierpiński space.
Sierpiński continued to collaborate with Luzin on investigations of analytic and projective sets.
It is an example of a Sierpiński space.
The Sierpiński space has important relations to the theory of computation and semantics.
We make a second copy of this half Sierpiński carpet and glue it on the right.
The Sierpiński space is both.
We make a third copy of this half Sierpiński carpet and glue it on the top.
Sierpiński was interned in Viatka.
See also
Then the group generated by these numbers is a Sierpiński set and a group under addition.
Wacław Sierpiński describes the Sierpinski triangle.
That subset has the same shape as the ith row of the Sierpiński triangle.
The existence of Sierpiński sets is independent of the axioms of ZFC.
An extension of the Pascal triangle and the Sierpiński gasket to finite words.
Wacław Sierpiński proves the existence of Sierpinski numbers.
It is named after Wacław Sierpiński.
The Sierpiński triangle.
This may fail in non-Hausdorff spaces such as Sierpiński space.
The Sierpiński space.
Cardinal and Ordinal Numbers is a book on transfinite numbers, by Polish mathematician Wacław Sierpiński.
The Sierpiński space is the simplest non-discrete topological space.
Like all finite topological spaces, the Sierpiński space is both compact and second-countable.
This is called the Sierpinski triangle, a fractal first described by Polish mathematician Wacław Sierpiński.
He was examined by Wacław Sierpiński and Stefan Mazurkiewicz, among others.
The Sierpiński problem is, " What is the smallest Sierpiński number?
In fact it was in 1907 that Sierpiński first became interested in set theory.
The Sierpinski carpet is a plane fractal first described by Wacław Sierpiński in 1916.
He was a student of Wacław Sierpiński and a member of the Polish Academy of Learning " PAU.
Wacław Sierpiński and Stefan Mazurkiewicz took over the role of editors-in-chief.
Continuous functions to the Sierpiński space = = Let " X " be an arbitrary set.
The Sierpiński problem = = The Sierpiński problem is, " What is the smallest Sierpiński number?
After his graduation in 1904, Sierpiński worked as a school teacher of mathematics and physics in Warsaw.
Because the Sierpiński curve is space-filling, its Hausdorff dimension ( in the limit formula 2 ) is formula 3.
In 1917, Wacław Sierpiński showed that it is possible to specify a particular such number.
In 1960, Wacław Sierpiński proved that there are infinitely many odd integers k which have this property.
