Examples of 'kolmogorov' in a sentence
Meaning of "kolmogorov"
Kolmogorov: Referring to Andrey Kolmogorov, a prominent Russian mathematician known for his work in probability theory and information theory
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- Such that any two distinct points are topologically distinguishable, i.e., there is an open set containing one of the points which does not contain the other point.
How to use "kolmogorov" in a sentence
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kolmogorov
Kolmogorov microscales are the smallest scales in turbulent flow.
Now look at the Kolmogorov complexity function.
Kolmogorov complexity depends on what computer language is used.
After his graduation he worked with Kolmogorov.
Kolmogorov complexity is used to quantify information in a factual way.
He also discussed the hierarchy of vortices Kolmogorov.
Kolmogorov complexity and information theory.
The problem of determining the Kolmogorov complexity of a string.
Kolmogorov complexity is not computable.
There are several variants of Kolmogorov complexity or algorithmic information.
Kolmogorov already axiomatised probability.
On the universality of the Kolmogorov constant.
Kolmogorov publishes his second paper on the theory of dynamical systems.
It is a special case of the Kolmogorov integral.
Kolmogorov was particularly interested in the deviation of actual rhythms from classical meters.
See also
This is today known as the Kolmogorov length scale.
Kolmogorov followed the same lines but phrased his interpretation in terms of problems and solutions.
It can be proven that the Kolmogorov complexity is not computable.
Kolmogorov is an invariant fundamental solution of the linear Kolmogorov equation.
This is an extension of Kolmogorov complexity.
We consider Kolmogorov nonlinear equations with an arbitrary function.
The scale at which this happens is the Kolmogorov length scale.
The Kolmogorov distribution is the distribution of the random variable.
Consider model classes consisting of models of given maximal Kolmogorov complexity.
Andrey Kolmogorov contributed a lot to this area but in later articles.
A topological space is preregular if and only if its Kolmogorov quotient is Hausdorff.
The mathematics of Kolmogorov complexity describes the challenges and limits of this.
The smallest scales in turbulent flow are known as the Kolmogorov microscales.
Dai showed that Kolmogorov complexity and linear complexity are practically the same.
Fundamental ingredients of the theory are the concepts of algorithmic probability and Kolmogorov complexity.
The second approach is to use Kolmogorov complexity as a tool for classification of fault signatures.
Fragmentation theory is much older and can be tracked back to Kolmogorov and Filippov.
We then use Kolmogorov complexity to define a new similarity measure obtained by lossless compression.
A finite difference method for a boundary value problem related to the Kolmogorov equation.
The definitions of the Kolmogorov microscales can be obtained using this idea and dimensional analysis.
The descriptive statistics and normality of the data were tested by the Kolmogorov Smirnov test.
All Bernoulli automorphisms are Kolmogorov automorphisms but not vice versa.
Completely regular spaces and Tychonoff spaces are related through the notion of Kolmogorov equivalence.
It is also called Kolmogorov complexity.
The broader area encompassing descriptional complexity and probability is often called Kolmogorov complexity.
The lagrangian spectrum is then in agreement with a Kolmogorov scaling prediction in the inertial range.
For some time Kolmogorov was interested in Russian history as well as mathematics.
These relationships are called Kolmogorov scaling.
Andrei Nicholaevich Kolmogorov proposed a problem solving basis for geometry.
By dimensional analysis Kolmogorov deduced.
Logical scheme of constructing the structure of Euclidian plane according to Kolmogorov.
The different terms of the Kolmogorov and Yaglom equations are estimated.
This variable presented an asymmetric distribution at right Kolmogorov Sminorv com p.
X is a Kolmogorov space.
Another method with occlusion handling was proposed by Kolmogorov and Zabih.
