An inequality involving the constant e and a generalized Carleman-type inequality

Padé approximant related to inequalities involving the constant e and a generalized Carleman-type inequality

Based on the Padé approximation method, in this paper we determine the coefficients [Formula: see text] and [Formula: see text] ([Formula: see text]) such that [Formula: see text] where [Formula: see text] is any given integer. Based on the obtained result, we establish new upper bounds for [Formula: see text]. As an application, we give a generalized Carleman-type inequality.

Note on weighted Carleman-type inequality

In (1.2), letting p → ∞, then the following Carleman inequality [6, page 249] is deduced: ∞ ∑ n=1 ( a1a2 ···an )1/n < e ∞ ∑ n=1 an, (1.3) where an ≥ 0 for n∈N and 0 < ∑∞ n=1 an <∞. The constant e is the best possible. Carleman’s inequality (1.3) was generalized in [6, page 256] by Hardy as follows. Let an ≥ 0, λn > 0, Λn = ∑n m=1 λm for n∈N, and 0 < ∑∞ n=1 λnan <∞, then ∞ ∑ n=1 λn ( a1 1 a λ2 2...

a cauchy-schwarz type inequality for fuzzy integrals

نامساوی کوشی-شوارتز در حالت کلاسیک در فضای اندازه فازی برقرار نمی باشد اما با اعمال شرط هایی در مسئله مانند یکنوا بودن توابع و قرار گرفتن در بازه صفر ویک می توان دو نوع نامساوی کوشی-شوارتز را در فضای اندازه فازی اثبات نمود.

The Brunn-Minkowski-Type Inequality

Maclaurin’s Inequality and a Generalized Bernoulli Inequality

Maclaurin’s inequality is a natural, but nontrivial, generalization of the arithmetic-geometric mean inequality. We present a new proof that is based on an analogous generalization of Bernoulli’s inequality. Applications of Maclaurin’s inequality to iterative sequences and probability are discussed, along with a graph-theoretic version of the inequality.