Add to ORKGBy using a method of [5] we obtain a simpler proof of a result of Chao-Ping Chen and Feng Qi [2]. By a method of Kuang Jichang [4], an extension is provided
AbstractA generalization of Alzer's inequality is proved. It is shown that this inequality is satisf...
Abstract. We apply the hypergeometric method of Thue and Siegel to prove, if a and b are positive in...
By using methods on the theory of majorization, the inequalities\ud between the sum of power and the...
By using a method of [5] we obtain a simpler proof\ud of a result of Chao-Ping Chen and Feng Qi [2]....
n=1 be a positive, strictly increasing, and logarithmically concave sequence satisfying (an+1/an) n ...
Abstract. If the sequence {ai} i=1 satisfies △ai = ai+1 − ai> 0, △ 2ai = △(△ai) = ai+2 − 2ai+1 +...
AbstractThis note gives a short alternative proof of one of the inequalities in an article by H. Alz...
Abstract In this paper, we prove one inequality with power functions. A simplified form of the inequ...
AbstractLet {an}n=1∞ be a strictly increasing positive sequence, and let m be a natural number and r...
AbstractUsing the mathematical induction and Cauchy's mean-value theorem, for any positive number r,...
AbstractBy the method of indeterminate coefficients we prove the inequality[formula]where an≥0,n=1,2...
In this paper, the open problem published in ([1]: Feng Qi, An algebraic inequality, J. Inequal. Pu...
We get an estimate from below for the height of the powers of a polynomial using Holder inequality a...
AbstractWe prove that the product of k consecutive terms of a primitive arithmetic progression is ne...
碩士[[abstract]]在2000年,F. Qi 和 L. Debnath 推廣了 Alzer 不等式,而在他們的證明中限制r為正實數且{a_1,a_2,...}是一個遞增的正實數數列。 在本論文...
AbstractA generalization of Alzer's inequality is proved. It is shown that this inequality is satisf...
Abstract. We apply the hypergeometric method of Thue and Siegel to prove, if a and b are positive in...
By using methods on the theory of majorization, the inequalities\ud between the sum of power and the...
By using a method of [5] we obtain a simpler proof\ud of a result of Chao-Ping Chen and Feng Qi [2]....
n=1 be a positive, strictly increasing, and logarithmically concave sequence satisfying (an+1/an) n ...
Abstract. If the sequence {ai} i=1 satisfies △ai = ai+1 − ai> 0, △ 2ai = △(△ai) = ai+2 − 2ai+1 +...
AbstractThis note gives a short alternative proof of one of the inequalities in an article by H. Alz...
Abstract In this paper, we prove one inequality with power functions. A simplified form of the inequ...
AbstractLet {an}n=1∞ be a strictly increasing positive sequence, and let m be a natural number and r...
AbstractUsing the mathematical induction and Cauchy's mean-value theorem, for any positive number r,...
AbstractBy the method of indeterminate coefficients we prove the inequality[formula]where an≥0,n=1,2...
In this paper, the open problem published in ([1]: Feng Qi, An algebraic inequality, J. Inequal. Pu...
We get an estimate from below for the height of the powers of a polynomial using Holder inequality a...
AbstractWe prove that the product of k consecutive terms of a primitive arithmetic progression is ne...
碩士[[abstract]]在2000年,F. Qi 和 L. Debnath 推廣了 Alzer 不等式,而在他們的證明中限制r為正實數且{a_1,a_2,...}是一個遞增的正實數數列。 在本論文...
AbstractA generalization of Alzer's inequality is proved. It is shown that this inequality is satisf...
Abstract. We apply the hypergeometric method of Thue and Siegel to prove, if a and b are positive in...
By using methods on the theory of majorization, the inequalities\ud between the sum of power and the...