mathematics Mathematics is a field of study that discovers and organizes methods, Mathematical theory, theories and theorems that are developed and Mathematical proof, proved for the needs of empirical sciences and mathematics itself. There are many ar ...

, the Dirichlet beta function (also known as the Catalan beta function) is a

special function Special functions are particular mathematical functions that have more or less established names and notations due to their importance in mathematical analysis, functional analysis, geometry, physics, or other applications. The term is defined by ...

, closely related to the

Riemann zeta function The Riemann zeta function or Euler–Riemann zeta function, denoted by the Greek letter (zeta), is a mathematical function of a complex variable defined as \zeta(s) = \sum_^\infty \frac = \frac + \frac + \frac + \cdots for and its analytic c ...

. It is a particular

Dirichlet L-function In mathematics, a Dirichlet L-series is a function of the form :L(s,\chi) = \sum_^\infty \frac. where \chi is a Dirichlet character and s a complex variable with real part greater than 1 . It is a special case of a Dirichlet series. By anal ...

, the L-function for the alternating character of period four.

Definition

The Dirichlet beta function is defined as :

\beta(s) = \sum_^\infty \frac ,

or, equivalently, :

\beta(s) = \frac\int_0^\frac\,dx.

In each case, it is assumed that Re(''s'') > 0. Alternatively, the following definition, in terms of the

Hurwitz zeta function In mathematics, the Hurwitz zeta function is one of the many zeta functions. It is formally defined for complex variables with and by :\zeta(s,a) = \sum_^\infty \frac. This series is absolutely convergent for the given values of and and c ...

, is valid in the whole complex ''s''-plane: :

\beta(s) = 4^ \left( \zeta\left(s,\right)-\zeta\left( s, \right) \right).

Another equivalent definition, in terms of the Lerch transcendent, is: :

\beta(s) = 2^ \Phi\left(-1,s,\right),

which is once again valid for all complex values of ''s''. The Dirichlet beta function can also be written in terms of the

polylogarithm In mathematics, the polylogarithm (also known as Jonquière's function, for Alfred Jonquière) is a special function of order and argument . Only for special values of does the polylogarithm reduce to an elementary function such as the natur ...

function: :

\beta(s) = \frac \left(\text_s(-i)-\text_s(i)\right).

Also the series representation of Dirichlet beta function can be formed in terms of the

polygamma function In mathematics, the polygamma function of order is a meromorphic function on the complex numbers \mathbb defined as the th derivative of the logarithm of the gamma function: :\psi^(z) := \frac \psi(z) = \frac \ln\Gamma(z). Thus :\psi^(z) ...

\beta(s) =\frac \sum_^\infty\frac=\frac1\left psi^\left(\frac\right)-\psi^\left(\frac\right)\right

but this formula is only valid at positive integer values of

s

Euler product formula

It is also the simplest example of a series non-directly related to

\zeta(s)

which can also be factorized as an

Euler product In number theory, an Euler product is an expansion of a Dirichlet series into an infinite product indexed by prime numbers. The original such product was given for the sum of all positive integers raised to a certain power as proven by Leonhard E ...

, thus leading to the idea of

Dirichlet character In analytic number theory and related branches of mathematics, a complex-valued arithmetic function \chi: \mathbb\rightarrow\mathbb is a Dirichlet character of modulus m (where m is a positive integer) if for all integers a and b: # \chi(ab) = \ch ...

defining the exact set of

Dirichlet series In mathematics, a Dirichlet series is any series of the form \sum_^\infty \frac, where ''s'' is complex, and a_n is a complex sequence. It is a special case of general Dirichlet series. Dirichlet series play a variety of important roles in anal ...

having a factorization over the

prime numbers A prime number (or a prime) is a natural number greater than 1 that is not a product of two smaller natural numbers. A natural number greater than 1 that is not prime is called a composite number. For example, 5 is prime because the only ways ...

. At least for Re(''s'') ≥ 1: :

\beta(s) = \prod_ \frac \prod_ \frac

where are the primes of the form (5,13,17,...) and are the primes of the form (3,7,11,...). This can be written compactly as :

\beta(s) = \prod_ \frac.

Functional equation

The

functional equation In mathematics, a functional equation is, in the broadest meaning, an equation in which one or several functions appear as unknowns. So, differential equations and integral equations are functional equations. However, a more restricted meaning ...

extends the beta function to the left side of the

complex plane In mathematics, the complex plane is the plane (geometry), plane formed by the complex numbers, with a Cartesian coordinate system such that the horizontal -axis, called the real axis, is formed by the real numbers, and the vertical -axis, call ...

Re(''s'') ≤ 0. It is given by :

\beta(1-s)=\left(\frac\right)^\sin\left(\fracs\right)\Gamma(s)\beta(s)

where Γ(''s'') is the

gamma function In mathematics, the gamma function (represented by Γ, capital Greek alphabet, Greek letter gamma) is the most common extension of the factorial function to complex numbers. Derived by Daniel Bernoulli, the gamma function \Gamma(z) is defined ...

. It was conjectured by

Euler Leonhard Euler ( ; ; ; 15 April 170718 September 1783) was a Swiss polymath who was active as a mathematician, physicist, astronomer, logician, geographer, and engineer. He founded the studies of graph theory and topology and made influential ...

in 1749 and proved by

Malmsten Malmsten is a Swedish language surname which may refer to: * Bengt Malmsten, Swedish Olympic speed skater * Birger Malmsten, Swedish actor * Bodil Malmsten, Swedish poet and novelist *Carl Johan Malmsten, Swedish mathematician * Eugen Malmstén, Sw ...

in 1842.

Specific values

Positive integers

For every odd positive integer

2n+1

, the following equation holds: :

\beta(2n+1)\;=\;\frac\left(\frac\pi2\right)^

where

E_n

is the n-th

Euler Number Leonhard Euler ( ; ; ; 15 April 170718 September 1783) was a Swiss polymath who was active as a mathematician, physicist, astronomer, logician, geographer, and engineer. He founded the studies of graph theory and topology and made influential ...

. This yields: :

\beta(1)\;=\;\frac,

\beta(3)\;=\;\frac,

\beta(5)\;=\;\frac,

\beta(7)\;=\;\frac

For the values of the Dirichlet beta function at even positive integers no elementary closed form is known, and no method has yet been found for determining the arithmetic nature of even beta values (similarly to the Riemann zeta function at odd integers greater than 3). The number

\beta(2)=G

is known as

Catalan's constant In mathematics, Catalan's constant , is the alternating sum of the reciprocals of the odd square numbers, being defined by: : G = \beta(2) = \sum_^ \frac = \frac - \frac + \frac - \frac + \frac - \cdots, where is the Dirichlet beta function ...

. It has been proven that infinitely many numbers of the form

\beta(2n)

and at least one of the numbers

\beta(2), \beta(4), \beta(6), ..., \beta(12)

are irrational. The even beta values may be given in terms of the polygamma functions and the

Bernoulli numbers In mathematics, the Bernoulli numbers are a sequence of rational numbers which occur frequently in analysis. The Bernoulli numbers appear in (and can be defined by) the Taylor series expansions of the tangent and hyperbolic tangent functions, ...

: :

\beta(2n)=\fracn - \frac

We can also express the beta function for positive

n

in terms of the inverse tangent integral: :

\beta(n)=\text_n(1)

\beta(1)=\arctan(1)

For every positive integer ''k'': :

\beta(2k)=\frac\sum_^\infty\left(\left(\sum_^\binom\frac\right)-\frac\right)\frac^,

where

A_

is the Euler zigzag number.

Negative integers

For negative odd integers, the function is zero: :

\beta(-2n-1)\;=\;0

For every negative even integer it holds: :

\beta(-2n)\;=\;\frac12E_

. It further is: :

\beta(0)\;=\; \frac

Derivative

We have:

\beta'(-1)=\frac\pi

\beta'(0)=2\ln\Gamma(\tfrac14)-\ln\pi-\tfrac32\ln2

\beta'(1)=\tfrac\pi4(\gamma+2\ln2+3\ln\pi-4\ln\Gamma(\tfrac14))

with

\gamma

being Euler's constant and

G

being Catalan's constant. The last identity was derived by