Dirichlet beta function

In mathematics, the Dirichlet beta function (also known as the Catalan beta function) is a special function, closely related to the Riemann zeta function. It is a particular Dirichlet L-function, the L-function for the alternating character of period four.

Definition

The Dirichlet beta function is defined as

\beta (s)=\sum _{n=0}^{\infty }{\frac {(-1)^{n}}{(2n+1)^{s}}},

or, equivalently,

\beta (s)={\frac {1}{\Gamma (s)}}\int _{0}^{\infty }{\frac {x^{s-1}e^{-x}}{1+e^{-2x}}}\,dx.

In each case, it is assumed that Re(s) > 0.

Alternatively, the following definition, in terms of the Hurwitz zeta function, is valid in the whole complex s-plane:^[1]

\beta (s)=4^{-s}\left(\zeta \left(s,{1 \over 4}\right)-\zeta \left(s,{3 \over 4}\right)\right).

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

\beta (s)=2^{-s}\Phi \left(-1,s,{{1} \over {2}}\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 function:

\beta (s)={\frac {i}{2}}\left({\text{Li}}_{s}(-i)-{\text{Li}}_{s}(i)\right).

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

\beta (s)={\frac {1}{2^{s}}}\sum _{n=0}^{\infty }{\frac {(-1)^{n}}{\left(n+{\frac {1}{2}}\right)^{s}}}={\frac {1}{(-4)^{s}(s-1)!}}\left[\psi ^{(s-1)}\left({\frac {1}{4}}\right)-\psi ^{(s-1)}\left({\frac {3}{4}}\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, thus leading to the idea of Dirichlet character defining the exact set of Dirichlet series having a factorization over the prime numbers.

At least for Re(s) ≥ 1:

\beta (s)=\prod _{p\equiv 1\ \mathrm {mod} \ 4}{\frac {1}{1-p^{-s}}}\prod _{p\equiv 3\ \mathrm {mod} \ 4}{\frac {1}{1+p^{-s}}}

where $p \equiv1 mod 4$ are the primes of the form $4 n +1$ (5,13,17,...) and $p \equiv3 mod 4$ are the primes of the form $4 n +3$ (3,7,11,...). This can be written compactly as

\beta (s)=\prod _{p>2 \atop p{\text{ prime}}}{\frac {1}{1-\,\scriptstyle (-1)^{\frac {p-1}{2}}\textstyle p^{-s}}}.

Functional equation

The functional equation extends the beta function to the left side of the complex plane Re(s) ≤ 0. It is given by

\beta (1-s)=\left({\frac {\pi }{2}}\right)^{-s}\sin \left({\frac {\pi }{2}}s\right)\Gamma (s)\beta (s)

where Γ(s) is the gamma function. It was conjectured by Euler in 1749 and proved by Malmsten in 1842 (see Blagouchine, 2014).

Specific values

For every positive odd integer $2n+1$ , the following equation holds:^[2]

\beta (2n+1)\;=\;{\frac {(-1)^{n}E_{2n}}{2(2n)!}}\left({\frac {\pi }{2}}\right)^{2n+1}

where $E_{n}$ is the n-th Euler Number. This yields:

\beta (1)\;=\;{\frac {\pi }{4}}=\arctan(1),

\beta (3)\;=\;{\frac {\pi ^{3}}{32}},

\beta (5)\;=\;{\frac {5\pi ^{5}}{1536}},

\beta (7)\;=\;{\frac {61\pi ^{7}}{184320}}

For negative odd integers, the function is zero:

\beta (-1)\;=\;\beta (-3)\;=\;\beta (-5)\;=\;...\;=\;0

For every negative even integer it holds^[2]:

\beta (-2n)\;=\;{\frac {1}{2}}E_{2k}

.

It further is:

\beta (0)\;=\;{\frac {1}{2}}

.

About the values of the Dirichlet beta function at positive even integers not much is known (similarly to the Riemann zeta function at odd integers greater than 3). The number $\beta (2)=G$ is known as Catalan's constant.

The number $\beta (4)$ may be given in terms of the polygamma function:

\beta (4)\;=\;{\frac {1}{768}}\left(\psi _{3}\!\left({\frac {1}{4}}\right)-8\pi ^{4}\right),

For every positive integer k:

\beta (2k)={\frac {1}{2(2k-1)!}}\sum _{m=0}^{\infty }\left(\left(\sum _{l=0}^{k-1}{\binom {2k-1}{2l}}{\frac {(-1)^{l}A_{2k-2l-1}}{2l+2m+1}}\right)-{\frac {(-1)^{k-1}}{2m+2k}}\right){\frac {A_{2m}}{(2m)!}}{\left({\frac {\pi }{2}}\right)}^{2m+2k},

^{[citation needed]}

where $A_{k}$ is the Euler zigzag number.

Also it was derived by Malmsten in 1842 (see Blagouchine, 2014) that

\beta '(1)=\sum _{n=1}^{\infty }(-1)^{n+1}{\frac {\ln(2n+1)}{2n+1}}\,=\,{\frac {\pi }{4}}{\big (}\gamma -\ln \pi )+\pi \ln \Gamma \left({\frac {3}{4}}\right)

s	approximate value β(s)	OEIS
1/5	0.5737108471859466493572665	A261624
1/4	0.5907230564424947318659591	A261623
1/3	0.6178550888488520660725389	A261622
1/2	0.6676914571896091766586909	A195103
1	0.7853981633974483096156608	A003881
2	0.9159655941772190150546035	A006752
3	0.9689461462593693804836348	A153071
4	0.9889445517411053361084226	A175572
5	0.9961578280770880640063194	A175571
6	0.9986852222184381354416008	A175570
7	0.9995545078905399094963465
8	0.9998499902468296563380671
9	0.9999496841872200898213589
10	0.9999831640261968774055407

References

^ Dirichlet Beta – Hurwitz zeta relation, Engineering Mathematics
^ ^a ^b Weisstein, Eric W. "Dirichlet Beta Function". mathworld.wolfram.com. Retrieved 2024-08-08.

Blagouchine, I. V. (2014). "Rediscovery of Malmsten's integrals, their evaluation by contour integration methods and some related results". Ramanujan J. 35 (1): 21–110. doi:10.1007/s11139-013-9528-5.
Glasser, M. L. (1972). "The evaluation of lattice sums. I. Analytic procedures". J. Math. Phys. 14 (3): 409. Bibcode:1973JMP....14..409G. doi:10.1063/1.1666331.
J. Spanier and K. B. Oldham, An Atlas of Functions, (1987) Hemisphere, New York.
Weisstein, Eric W. "Dirichlet Beta Function". MathWorld.

[1] Dirichlet Beta – Hurwitz zeta relation, Engineering Mathematics

[:0-2] Weisstein, Eric W. "Dirichlet Beta Function". mathworld.wolfram.com. Retrieved 2024-08-08.

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