Examples of 'dirichlet' in a sentence
Meaning of "dirichlet"
dirichlet (noun) - Dirichlet is a mathematical term that refers to a specific type of mathematical function or distribution named after the mathematician Peter Gustav Lejeune Dirichlet. It is commonly used in number theory and probability
How to use "dirichlet" in a sentence
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dirichlet
Dirichlet theorem on primes in arithmetic progressions.
Regularized trace of the inverse of the dirichlet laplacian.
Dirichlet boundary conditions are applied at the point elements.
This is used in the definition of Dirichlet density.
Dirichlet characters can be seen as a special case of this definition.
His interest was initially in finite Dirichlet series.
Dirichlet theorem on arithmetic progressions.
The latter series is an example of a Dirichlet series.
Dirichlet prime number theorem.
The boundary conditions of Dirichlet type are given by.
Dirichlet class number formula.
Riemann was at least as fanatical as Dirichlet on these matters.
Dirichlet series play a variety of important roles in analytic number theory.
This integral is known as the Dirichlet integral.
Dirichlet theorem on primes.
See also
A characterization of the Dirichlet distribution as prior.
Dirichlet boundary conditions.
This requirement is called the Dirichlet boundary condition.
Dirichlet boundary condition.
The same issues apply to the Dirichlet distribution.
Dirichlet convergence test.
This is a consequence of the Dirichlet theorem.
Dirichlet unit theorem.
There are several equivalent views of the Dirichlet process.
Dirichlet eta function.
It is a special case of the Dirichlet distribution.
Dirichlet beta function.
Such sums are known as Dirichlet series.
The Dirichlet tessellations have something to tell us.
The resulting function will then be a Dirichlet character.
All Dirichlet characters are completely multiplicative functions.
The positive answer is provided by the Dirichlet principle.
Gauss sum for Dirichlet characters on the modulo.
An important operation on arithmetic functions is the Dirichlet convolution.
Dirichlet processes are frequently used in Bayesian nonparametric statistics.
The most famous of Dirichlet series is.
Some Dirichlet averages are so fundamental that they are named.
This series can be directly generalized to general Dirichlet series.
We can see the Dirichlet integral in terms of distributions.
Such boundary conditions are also called Dirichlet boundary conditions.
The Dirichlet inverse of an arithmetic function.
The tables below help illustrate the nature of a Dirichlet character.
For χ a Dirichlet character with conductor f.
On the growth of analytic functions represented by the Dirichlet series on semistrips.
Dirichlet distributions are very often used as priordistributions in Bayesianinference.
Univariate marginals of the Dirichlet distribution have a beta distribution.
The Dirichlet convolution of two functions and is given by.
In some simple cases the Dirichlet problem can be solved explicitly.
The Dirichlet distribution is a conjugate distribution to the multinomial distribution.
The question of finding solutions to such equations is known as the Dirichlet problem.
