List of sums of reciprocals explained

In mathematics and especially number theory, the sum of reciprocals generally is computed for the reciprocals of some or all of the positive integers (counting numbers) - that is, it is generally the sum of unit fractions. If infinitely many numbers have their reciprocals summed, generally the terms are given in a certain sequence and the first n of them are summed, then one more is included to give the sum of the first n+1 of them, etc.

If only finitely many numbers are included, the key issue is usually to find a simple expression for the value of the sum, or to require the sum to be less than a certain value, or to determine whether the sum is ever an integer.

For an infinite series of reciprocals, the issues are twofold: First, does the sequence of sums diverge—that is, does it eventually exceed any given number—or does it converge, meaning there is some number that it gets arbitrarily close to without ever exceeding it? (A set of positive integers is said to be large if the sum of its reciprocals diverges, and small if it converges.) Second, if it converges, what is a simple expression for the value it converges to, is that value rational or irrational, and is that value algebraic or transcendental?[1]

Finitely many terms

2p-1-1
p
for odd prime p, when expressed in mod p and multiplied by –2, equals the sum of the reciprocals mod p of the numbers lying in the first half of the range .
\pi
p

,

\pi
q

,

and
\pi
r

.

Then the triangle is in Euclidean space if the sum of the reciprocals of p, q, and r equals 1, spherical space if that sum is greater than 1, and hyperbolic space if the sum is less than 1.

Infinitely many terms

Convergent series

nn

is approximately equal to  . The sum is exactly equal to a definite integral: \ \sum_^\infty \frac = \int_0^1 \frac\

This identity was discovered by Johann Bernoulli in 1697, and is now known as one of the two Sophomore's dream identities.

a0=1,~an=

an
n

~.

For example,

a4=

21
3
4

where the exponents are evaluated from the top down. The sum of the reciprocals of the exponential factorials from 1 onward is approximately 1.6111 and is transcendental.
(2n)
 2

+1 

) is irrational.

Divergent series

\gamma,

which is approximately  .

a2+b2 ,

where and are non-negative integers, not both equal to, diverges, with or without repetition.

See also

Notes and References

  1. Unless given here, references are in the linked articles.
  2. Borsos . Bertalan . Kovács . Attila . Tihanyi . Norbert . Tight upper and lower bounds for the reciprocal sum of Proth primes . The Ramanujan Journal . 1 September 2022 . 59 . 1 . 181–198 . 10.1007/s11139-021-00536-2. 246024152 . 10831/83020 . free .
  3. Golomb . S.W. . Solomon W. Golomb . 1970 . Powerful numbers . . 77 . 8 . 848–852 . 10.2307/2317020 . 2317020.