Turan´ s inequality type for polygamma functions and some new inequalities
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Keywords:
Turan-type inequality, polygamma functionsAbstract
Turan’s inequality is known as
Pn−1(x)Pn+1(x) ≤ P
2
n
(x), x ∈ [−1, 1], n = 1, 2, ...,
where Pn denotes the Legendre polynomial of degree n . In this note, we show that Turan´
s
inequality is still true when the Legendre polynomial of degree n replace by
Ψn(x) = 1
(−1)n+1 Z ∞
0
e
−txt
n
1 − e−t
dt
polygamma function of order n. In fact, we prove more than Turn’s type inequality that zero
is the greatest lower bound of the sequence
{Ψ
2
n
(x) − Ψn−1(x)Ψn+1(x)}.
Moreover, some new inequalities for polygamma function of order n are established.
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Published
2019-01-30
How to Cite
A.P. Farajzadeh. (2019). Turan´ s inequality type for polygamma functions and some new inequalities. Bulletin of L.N. Gumilyov Eurasian National University. Mathematics, Computer Science, Mechanics Series, 126(1), 68–71. Retrieved from https://bulmathmc.enu.kz/index.php/main/article/view/43
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