Inverse tangent integral
The inverse tangent integral is a special function, defined by:
Equivalently, it can be defined by a power series, or in terms of the dilogarithm, a closely related special function.
Definition
[edit]The inverse tangent integral is defined by:
The arctangent is taken to be the principal branch; that is, −π/2 < arctan(t) < π/2 for all real t.[1]
Its power series representation is
which is absolutely convergent for [1]
The inverse tangent integral is closely related to the dilogarithm and can be expressed simply in terms of it:
That is,
for all real x.[1]
Properties
[edit]The inverse tangent integral is an odd function:[1]
The values of Ti2(x) and Ti2(1/x) are related by the identity
valid for all x > 0 (or, more generally, for Re(x) > 0). This can be proven by differentiating and using the identity .[2][3]
The special value Ti2(1) is Catalan's constant .[3]
Generalizations
[edit]Similar to the polylogarithm , the function
is defined analogously. This satisfies the recurrence relation:[4]
By this series representation it can be seen that the special values , where represents the Dirichlet beta function.
Relation to other special functions
[edit]The inverse tangent integral is related to the Legendre chi function by:[1]
Note that can be expressed as , similar to the inverse tangent integral but with the inverse hyperbolic tangent instead.
The inverse tangent integral can also be written in terms of the Lerch transcendent [5]
History
[edit]The notation Ti2 and Tin is due to Lewin. Spence (1809)[6] studied the function, using the notation . The function was also studied by Ramanujan.[2]
References
[edit]- ^ a b c d e Lewin 1981, pp. 38–39, Section 2.1
- ^ a b Ramanujan, S. (1915). "On the integral ". Journal of the Indian Mathematical Society. 7: 93–96. Appears in: Hardy, G. H.; Seshu Aiyar, P. V.; Wilson, B. M., eds. (1927). Collected Papers of Srinivasa Ramanujan. pp. 40–43.
- ^ a b Lewin 1981, pp. 39–40, Section 2.2
- ^ Lewin 1981, p. 190, Section 7.1.2
- ^ Weisstein, Eric W. "Inverse Tangent Integral". MathWorld.
- ^ Spence, William (1809). An essay on the theory of the various orders of logarithmic transcendents; with an inquiry into their applications to the integral calculus and the summation of series. London.
- Lewin, L. (1958). Dilogarithms and Associated Functions. London: Macdonald. MR 0105524. Zbl 0083.35904.
- Lewin, L. (1981). Polylogarithms and Associated Functions. New York: North-Holland. ISBN 978-0-444-00550-2.