A Note On Generalization Of Classical Jensens Inequality

a generalization of strong causality

در این رساله t_n - علیت قوی تعریف می شود. این رده ها در جدول علیت فضا- زمان بین علیت پایدار و علیت قوی قرار دارند. یک قضیه برای رده بندی آنها ثابت می شود و t_n- علیت قوی با رده های علی کارتر مقایسه می شود. همچنین ثابت می شود که علیت فشرده پایدار از t_n - علیت قوی نتیجه می شود. بعلاوه به بررسی رابطه نظریه دامنه ها با نسبیت عام می پردازیم و ثابت می کنیم که نوع خاصی از فضا- زمان های علی پایدار, ب...

Generalization on Kantorovich Inequality

In this paper, we provide a new form of upper bound for the converse of Jensen’s inequality. Thereby, known estimations of the difference and ratio in Jensen’s inequality are essentially improved. As an application, we also obtain an improvement of Kantorovich inequality.

On a Generalization of an Inequality Of

G. E. Forsythe, who edited the translation of Kantorovich's paper, included the following remark about this footnote: "It is not clear to me that Kantorovich's inequality really is a special case of that of Polya and Szego." Examining the relation between the two inequalities more closely we found that this remark is well justified and can be made even more specific in that the inequality of Po...

A Note on Inductive Generalization

On a New Generalization of Alzer’s Inequality

Let {an}n=1 be an increasing sequence of positive real numbers. Under certain conditions of this sequence we use themathematical induction and the Cauchymean-value theorem to prove the following inequality: an an+m ≤ ( (1/n) ∑n i=1ai (1/(n+m))∑n+m i=1 ai )1/r , where n and m are natural numbers and r is a positive number. The lower bound is best possible. This inequality generalizes the Alzer’s...