Particular values of the Riemann zeta function

At zero, one has

$${\displaystyle \zeta (0)={B_{1}^{-}}=-{B_{1}^{+}}=-{\tfrac {1}{2}}\!}$$

At 1 there is a pole, so ζ(1) is not finite but the left and right limits are:

$${\displaystyle \lim _{\varepsilon \to 0^{\pm }}\zeta (1+\varepsilon )=\pm \infty }$$

$${\displaystyle \lim _{\varepsilon \to 0}\varepsilon \zeta (1+\varepsilon )=1\,.}$$

Even positive integers

For the even positive integers ${\displaystyle n}$ , one has the relationship to the Bernoulli numbers ${\displaystyle B_{n}}$ :

$${\displaystyle \zeta (n)=(-1)^{{\tfrac {n}{2}}+1}{\frac {(2\pi )^{n}B_{n}}{2(n!)}}\,.}$$

The computation of ${\displaystyle \zeta (2)}$ is known as the Basel problem. The value of ${\displaystyle \zeta (4)}$ is related to the Stefan–Boltzmann law and Wien approximation in physics. The first few values are given by:

$${\displaystyle {\begin{aligned}\zeta (2)&=1+{\frac {1}{2^{2}}}+{\frac {1}{3^{2}}}+\cdots ={\frac {\pi ^{2}}{6}}\\[4pt]\zeta (4)&=1+{\frac {1}{2^{4}}}+{\frac {1}{3^{4}}}+\cdots ={\frac {\pi ^{4}}{90}}\\[4pt]\zeta (6)&=1+{\frac {1}{2^{6}}}+{\frac {1}{3^{6}}}+\cdots ={\frac {\pi ^{6}}{945}}\\[4pt]\zeta (8)&=1+{\frac {1}{2^{8}}}+{\frac {1}{3^{8}}}+\cdots ={\frac {\pi ^{8}}{9450}}\\[4pt]\zeta (10)&=1+{\frac {1}{2^{10}}}+{\frac {1}{3^{10}}}+\cdots ={\frac {\pi ^{10}}{93555}}\\[4pt]\zeta (12)&=1+{\frac {1}{2^{12}}}+{\frac {1}{3^{12}}}+\cdots ={\frac {691\pi ^{12}}{638512875}}\\[4pt]\zeta (14)&=1+{\frac {1}{2^{14}}}+{\frac {1}{3^{14}}}+\cdots ={\frac {2\pi ^{14}}{18243225}}\\[4pt]\zeta (16)&=1+{\frac {1}{2^{16}}}+{\frac {1}{3^{16}}}+\cdots ={\frac {3617\pi ^{16}}{325641566250}}\,.\end{aligned}}}$$

Taking the limit ${\displaystyle n\rightarrow \infty }$ , one obtains ${\displaystyle \zeta (\infty )=1}$ .

Selected values for even integers

Value	Decimal expansion	Source
${\displaystyle \zeta (2)}$	1.6449340668482264364...	OEIS: A013661
${\displaystyle \zeta (4)}$	1.0823232337111381915...	OEIS: A013662
${\displaystyle \zeta (6)}$	1.0173430619844491397...	OEIS: A013664
${\displaystyle \zeta (8)}$	1.0040773561979443393...	OEIS: A013666
${\displaystyle \zeta (10)}$	1.0009945751278180853...	OEIS: A013668
${\displaystyle \zeta (12)}$	1.0002460865533080482...	OEIS: A013670
${\displaystyle \zeta (14)}$	1.0000612481350587048...	OEIS: A013672
${\displaystyle \zeta (16)}$	1.0000152822594086518...	OEIS: A013674

The relationship between zeta at the positive even integers and the Bernoulli numbers may be written as

$${\displaystyle A_{n}\zeta (2n)=\pi ^{2n}B_{n}}$$

where ${\displaystyle A_{n}}$ and ${\displaystyle B_{n}}$ are integers for all even ${\displaystyle n}$ . These are given by the integer sequences OEIS: A002432 and OEIS: A046988, respectively, in OEIS. Some of these values are reproduced below:

If we let ${\displaystyle \eta _{n}=B_{n}/A_{n}}$ be the coefficient of ${\displaystyle \pi ^{2n}}$ as above,

$${\displaystyle \zeta (2n)=\sum _{\ell =1}^{\infty }{\frac {1}{\ell ^{2n}}}=\eta _{n}\pi ^{2n}}$$

$${\displaystyle {\begin{aligned}\eta _{1}&=1/6\\\eta _{n}&=\sum _{\ell =1}^{n-1}(-1)^{\ell -1}{\frac {\eta _{n-\ell }}{(2\ell +1)!}}+(-1)^{n+1}{\frac {n}{(2n+1)!}}\end{aligned}}}$$

This recurrence relation may be derived from that for the Bernoulli numbers.

Also, there is another recurrence:

$${\displaystyle \zeta (2n)={\frac {1}{n+{\frac {1}{2}}}}\sum _{k=1}^{n-1}\zeta (2k)\zeta (2n-2k)\quad {\text{ for }}\quad n>1}$$

${\displaystyle {\frac {d}{dx}}\cot(x)=-1-\cot ^{2}(x)}$

The values of the zeta function at non-negative even integers have the generating function:

$${\displaystyle \sum _{n=0}^{\infty }\zeta (2n)x^{2n}=-{\frac {\pi x}{2}}\cot(\pi x)=-{\frac {1}{2}}+{\frac {\pi ^{2}}{6}}x^{2}+{\frac {\pi ^{4}}{90}}x^{4}+{\frac {\pi ^{6}}{945}}x^{6}+\cdots }$$

$${\displaystyle \lim _{n\rightarrow \infty }\zeta (2n)=1}$$

${\displaystyle n\in \mathbb {N} ,n\rightarrow \infty }$

$${\displaystyle \left|B_{2n}\right|\sim {\frac {(2n)!\,2}{\;~(2\pi )^{2n}\,}}}$$

Odd positive integers

The sum of the harmonic series is infinite.

$${\displaystyle \zeta (1)=1+{\frac {1}{2}}+{\frac {1}{3}}+\cdots =\infty \!}$$

The value ζ(3) is also known as Apéry's constant and has a role in the electron's gyromagnetic ratio.The value ζ(3) also appears in Planck's law.These and additional values are:

Selected values for odd integers

Value	Decimal expansion	Source
${\displaystyle \zeta (3)}$	1.2020569031595942853...	OEIS: A02117
${\displaystyle \zeta (5)}$	1.0369277551433699263...	OEIS: A013663
${\displaystyle \zeta (7)}$	1.0083492773819228268...	OEIS: A013665
${\displaystyle \zeta (9)}$	1.0020083928260822144...	OEIS: A013667
${\displaystyle \zeta (11)}$	1.0004941886041194645...	OEIS: A013669
${\displaystyle \zeta (13)}$	1.0001227133475784891...	OEIS: A013671
${\displaystyle \zeta (15)}$	1.0000305882363070204...	OEIS: A013673

It is known that ζ(3) is irrational (Apéry's theorem) and that infinitely many of the numbers ζ(2n + 1) : n ∈ ${\displaystyle \mathbb {N} }$ , are irrational.^[1] There are also results on the irrationality of values of the Riemann zeta function at the elements of certain subsets of the positive odd integers; for example, at least one of ζ(5), ζ(7), ζ(9), or ζ(11) is irrational.^[2]

The positive odd integers of the zeta function appear in physics, specifically correlation functions of antiferromagnetic XXX spin chain.^[3]

Most of the identities following below are provided by Simon Plouffe. They are notable in that they converge quite rapidly, giving almost three digits of precision per iteration, and are thus useful for high-precision calculations.

Plouffe stated the following identities without proof.^[4] Proofs were later given by other authors.^[5]

ζ(5)

$${\displaystyle {\begin{aligned}\zeta (5)&={\frac {1}{294}}\pi ^{5}-{\frac {72}{35}}\sum _{n=1}^{\infty }{\frac {1}{n^{5}(e^{2\pi n}-1)}}-{\frac {2}{35}}\sum _{n=1}^{\infty }{\frac {1}{n^{5}(e^{2\pi n}+1)}}\\\zeta (5)&=12\sum _{n=1}^{\infty }{\frac {1}{n^{5}\sinh(\pi n)}}-{\frac {39}{20}}\sum _{n=1}^{\infty }{\frac {1}{n^{5}(e^{2\pi n}-1)}}+{\frac {1}{20}}\sum _{n=1}^{\infty }{\frac {1}{n^{5}(e^{2\pi n}+1)}}\end{aligned}}}$$

ζ(7)

$${\displaystyle \zeta (7)={\frac {19}{56700}}\pi ^{7}-2\sum _{n=1}^{\infty }{\frac {1}{n^{7}(e^{2\pi n}-1)}}\!}$$

Note that the sum is in the form of a Lambert series.

ζ(2n + 1)

By defining the quantities

$${\displaystyle S_{\pm }(s)=\sum _{n=1}^{\infty }{\frac {1}{n^{s}(e^{2\pi n}\pm 1)}}}$$

a series of relationships can be given in the form

$${\displaystyle 0=A_{n}\zeta (n)-B_{n}\pi ^{n}+C_{n}S_{-}(n)+D_{n}S_{+}(n)}$$

where A_n, B_n, C_n and D_n are positive integers. Plouffe gives a table of values:

These integer constants may be expressed as sums over Bernoulli numbers, as given in (Vepstas, 2006) below.

A fast algorithm for the calculation of Riemann's zeta function for any integer argument is given by E. A. Karatsuba.^[6][7][8]

In general, for negative integers (and also zero), one has

$${\displaystyle \zeta (-n)=(-1)^{n}{\frac {B_{n+1}}{n+1}}}$$

The so-called "trivial zeros" occur at the negative even integers:

$${\displaystyle \zeta (-2n)=0}$$

The first few values for negative odd integers are

$${\displaystyle {\begin{aligned}\zeta (-1)&=-{\frac {1}{12}}\\[4pt]\zeta (-3)&={\frac {1}{120}}\\[4pt]\zeta (-5)&=-{\frac {1}{252}}\\[4pt]\zeta (-7)&={\frac {1}{240}}\\[4pt]\zeta (-9)&=-{\frac {1}{132}}\\[4pt]\zeta (-11)&={\frac {691}{32760}}\\[4pt]\zeta (-13)&=-{\frac {1}{12}}\end{aligned}}}$$

However, just like the Bernoulli numbers, these do not stay small for increasingly negative odd values. For details on the first value, see 1 + 2 + 3 + 4 + · · ·.

So ζ(m) can be used as the definition of all (including those for index 0 and 1) Bernoulli numbers.

The derivative of the zeta function at the negative even integers is given by

$${\displaystyle \zeta ^{\prime }(-2n)=(-1)^{n}{\frac {(2n)!}{2(2\pi )^{2n}}}\zeta (2n+1)\,.}$$

The first few values of which are

$${\displaystyle {\begin{aligned}\zeta ^{\prime }(-2)&=-{\frac {\zeta (3)}{4\pi ^{2}}}\\[4pt]\zeta ^{\prime }(-4)&={\frac {3}{4\pi ^{4}}}\zeta (5)\\[4pt]\zeta ^{\prime }(-6)&=-{\frac {45}{8\pi ^{6}}}\zeta (7)\\[4pt]\zeta ^{\prime }(-8)&={\frac {315}{4\pi ^{8}}}\zeta (9)\,.\end{aligned}}}$$

One also has

$${\displaystyle {\begin{aligned}\zeta ^{\prime }(0)&=-{\frac {1}{2}}\ln(2\pi )\\[4pt]\zeta ^{\prime }(-1)&={\frac {1}{12}}-\ln A\\[4pt]\zeta ^{\prime }(2)&={\frac {1}{6}}\pi ^{2}(\gamma +\ln 2-12\ln A+\ln \pi )\end{aligned}}}$$

where A is the Glaisher–Kinkelin constant. The first of these identities implies that the regularized product of the reciprocals of the positive integers is ${\displaystyle 1/{\sqrt {2\pi }}}$ , thus the amusing "equation" ${\displaystyle \infty !={\sqrt {2\pi }}}$ .^[9]

From the logarithmic derivative of the functional equation,

$${\displaystyle 2{\frac {\zeta '(1/2)}{\zeta (1/2)}}=\log(2\pi )+{\frac {\pi \cos(\pi /4)}{2\sin(\pi /4)}}-{\frac {\Gamma '(1/2)}{\Gamma (1/2)}}=\log(2\pi )+{\frac {\pi }{2}}+2\log 2+\gamma \,.}$$

Selected derivatives

Value	Decimal expansion	Source
${\displaystyle \zeta '(3)}$	−0.19812624288563685333...	OEIS: A244115
${\displaystyle \zeta '(2)}$	−0.93754825431584375370...	OEIS: A073002
${\displaystyle \zeta '(0)}$	−0.91893853320467274178...	OEIS: A075700
${\displaystyle \zeta '(-{\tfrac {1}{2}})}$	−0.36085433959994760734...	OEIS: A271854
${\displaystyle \zeta '(-1)}$	−0.16542114370045092921...	OEIS: A084448
${\displaystyle \zeta '(-2)}$	−0.030448457058393270780...	OEIS: A240966
${\displaystyle \zeta '(-3)}$	+0.0053785763577743011444...	OEIS: A259068
${\displaystyle \zeta '(-4)}$	+0.0079838114502686242806...	OEIS: A259069
${\displaystyle \zeta '(-5)}$	−0.00057298598019863520499...	OEIS: A259070
${\displaystyle \zeta '(-6)}$	−0.0058997591435159374506...	OEIS: A259071
${\displaystyle \zeta '(-7)}$	−0.00072864268015924065246...	OEIS: A259072
${\displaystyle \zeta '(-8)}$	+0.0083161619856022473595...	OEIS: A259073

The following sums can be derived from the generating function:

$${\displaystyle \sum _{k=2}^{\infty }\zeta (k)x^{k-1}=-\psi _{0}(1-x)-\gamma }$$

$${\displaystyle {\begin{aligned}\sum _{k=2}^{\infty }(\zeta (k)-1)&=1\\[4pt]\sum _{k=1}^{\infty }(\zeta (2k)-1)&={\frac {3}{4}}\\[4pt]\sum _{k=1}^{\infty }(\zeta (2k+1)-1)&={\frac {1}{4}}\\[4pt]\sum _{k=2}^{\infty }(-1)^{k}(\zeta (k)-1)&={\frac {1}{2}}\end{aligned}}}$$

Series related to the Euler–Mascheroni constant (denoted by γ) are

$${\displaystyle {\begin{aligned}\sum _{k=2}^{\infty }(-1)^{k}{\frac {\zeta (k)}{k}}&=\gamma \\[4pt]\sum _{k=2}^{\infty }{\frac {\zeta (k)-1}{k}}&=1-\gamma \\[4pt]\sum _{k=2}^{\infty }(-1)^{k}{\frac {\zeta (k)-1}{k}}&=\ln 2+\gamma -1\end{aligned}}}$$

and using the principal value

$${\displaystyle \zeta (k)=\lim _{\varepsilon \to 0}{\frac {\zeta (k+\varepsilon )+\zeta (k-\varepsilon )}{2}}}$$

$${\displaystyle {\begin{aligned}\sum _{k=1}^{\infty }(-1)^{k}{\frac {\zeta (k)}{k}}&=0\\[4pt]\sum _{k=1}^{\infty }{\frac {\zeta (k)-1}{k}}&=0\\[4pt]\sum _{k=1}^{\infty }(-1)^{k}{\frac {\zeta (k)-1}{k}}&=\ln 2\end{aligned}}}$$

and show that they depend on the principal value of ζ(1) = γ .

Zeros of the Riemann zeta except negative even integers are called "nontrivial zeros". The Riemann hypothesis states that the real part of every nontrivial zero must be 1/2. In other words, all known nontrivial zeros of the Riemann zeta are of the form z = 1/2 + yi where y is a real number. The following table contains the decimal expansion of Im(z) for the first few nontrivial zeros:

Andrew Odlyzko computed the first 2 million nontrivial zeros accurate to within 4×10⁻⁹, and the first 100 zeros accurate within 1000 decimal places. See their website for the tables and bibliographies.^[10][11]A table of about 103 billion zeros with high precision (of ±2^-102≈±2·10^-31) is available for interactive access and download (although in a very inconvenient compressed format) via LMFDB.^[12]

Although evaluating particular values of the zeta function is difficult, often certain ratios can be found by inserting particular values of the gamma function into the functional equation

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

We have simple relations for half-integer arguments

${\displaystyle {\begin{aligned}{\frac {\zeta (3/2)}{\zeta (-1/2)}}&=-4\pi \\{\frac {\zeta (5/2)}{\zeta (-3/2)}}&=-{\frac {16\pi ^{2}}{3}}\\{\frac {\zeta (7/2)}{\zeta (-5/2)}}&={\frac {64\pi ^{3}}{15}}\\{\frac {\zeta (9/2)}{\zeta (-7/2)}}&={\frac {256\pi ^{4}}{105}}\end{aligned}}}$

Other examples follow for more complicated evaluations and relations of the gamma function. For example a consequence of the relation

${\displaystyle \Gamma \left({\tfrac {3}{4}}\right)=\left({\tfrac {\pi }{2}}\right)^{\tfrac {1}{4}}{\operatorname {AGM} \left({\sqrt {2}},1\right)}^{\tfrac {1}{2}}}$

is the zeta ratio relation

${\displaystyle {\frac {\zeta (3/4)}{\zeta (1/4)}}=2{\sqrt {\frac {\pi }{(2-{\sqrt {2}})\operatorname {AGM} \left({\sqrt {2}},1\right)}}}}$

where AGM is the arithmetic–geometric mean. In a similar vein, it is possible to form radical relations, such as from

${\displaystyle {\frac {\Gamma \left({\frac {1}{5}}\right)^{2}}{\Gamma \left({\frac {1}{10}}\right)\Gamma \left({\frac {3}{10}}\right)}}={\frac {\sqrt {1+{\sqrt {5}}}}{2^{\tfrac {7}{10}}{\sqrt[{4}]{5}}}}}$

the analogous zeta relation is

${\displaystyle {\frac {\zeta (1/5)^{2}\zeta (7/10)\zeta (9/10)}{\zeta (1/10)\zeta (3/10)\zeta (4/5)^{2}}}={\frac {(5-{\sqrt {5}})\left({\sqrt {10}}+{\sqrt {5+{\sqrt {5}}}}\right)}{10\cdot 2^{\tfrac {3}{10}}}}}$

• Ciaurri, Óscar; Navas, Luis M.; Ruiz, Francisco J.; Varona, Juan L. (May 2015). "A Simple Computation of ζ(2k)". The American Mathematical Monthly. 122 (5): 444–451. doi:10.4169/amer.math.monthly.122.5.444. JSTOR 10.4169/amer.math.monthly.122.5.444. S2CID 207521195.
• Simon Plouffe, "Identities inspired from Ramanujan Notebooks Archived 2009-01-30 at the Wayback Machine", (1998).
• Simon Plouffe, "Identities inspired by Ramanujan Notebooks part 2 PDF Archived 2011-09-26 at the Wayback Machine" (2006).
• Vepstas, Linas (2006). "On Plouffe's Ramanujan identities" (PDF). The Ramanujan Journal. 27 (3): 387–408. arXiv:math.NT/0609775. doi:10.1007/s11139-011-9335-9. S2CID 8789411.
• Zudilin, Wadim (2001). "One of the Numbers ζ(5), ζ(7), ζ(9), ζ(11) Is Irrational". Russian Mathematical Surveys. 56 (4): 774–776. Bibcode:2001RuMaS..56..774Z. doi:10.1070/RM2001v056n04ABEH000427. MR 1861452. S2CID 250734661. PDF PDF Russian PS Russian
• Nontrival zeros reference by Andrew Odlyzko:
  • Bibliography
  • Tables