Inequalities for cyclic functions. Alzer, H., Salinas, L. C., & Ruscheweyh, S. T. Journal of Approximation Theory, 112(2):216-225, 2001. doi abstract bibtex The nth cyclic function is defined by We prove that if k is an integer with 1 ≤ k ≤ n-1, then holds for all positive real numbers x with the best possible constants © 2001 Academic Press.
@article{10.1006/jath.2001.3610,
abstract = "The nth cyclic function is defined by We prove that if k is an integer with 1 ≤ k ≤ n-1, then holds for all positive real numbers x with the best possible constants © 2001 Academic Press.",
number = "2",
year = "2001",
title = "Inequalities for cyclic functions",
volume = "112",
keywords = "Cyclic functions , Gamma function , Inequalities",
pages = "216-225",
doi = "10.1006/jath.2001.3610",
journal = "Journal of Approximation Theory",
author = "Alzer, Horst and Salinas, Luís C. and Ruscheweyh, Stephan T."
}
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