Some papers and preprints in 1999 by Dr. Prof. Feng Qi

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Some papers and preprints in 1999

Fourteen papers formally published in 1999

1999年正式发表的14篇论文

  1. Feng Qi, Generalization of H. Alzer’s inequality, Journal of Mathematical Analysis and Applications 240 (1999), no. 1, 294–297; Available online at http://dx.doi.org/10.1006/jmaa.1999.6587.

    • Cited by-被引用情况
      1. Jian-She Sun, Further generalizations of inequalities and monotonicity for the ratio of gamma function, International Journal Applied Mathematical Sciences 2 (2005), no. 2, 248–257.
      2. Jiding Liao and Kaizhong Guan, On Alzer’s inequality and its generalized forms, Journal of Mathematical Inequalities 4 (2010), no. 2, 161–170.
      3. Chao-Ping Chen, The monotonicity of the ratio between generalized logarithmic means, Journal of Mathematical Analysis and Applications 345 (2008), no. 1, 86–89.
      4. S. Abramovich, J. Barić, M. Matić and J. Pečarić, On van de Lune-Alzer’s inequality, Journal of Mathematical Inequalities 1 (2007), no. 4, 563–587.
      5. Jeong Sheok Ume, Zeqing Liu and John N. McDonald, A simple proof of generalized Alzer’s inequality, Indian Journal of Pure and Applied Mathematics 35 (2004), no. 8, 969–971.
      6. Grahame Bennett, Meaningful inequalities, Journal of Mathematical Inequalities 1 (2007), no. 4, 449–471.
      7. P. S. Bullen, Handbook of Means and Their Inequalities, Mathematics and its Applications, Volume 560, page 263, Kluwer Academic Publishers, 2003.
      8. Jian-She Sun, Monotonicity results and inequalities involving the gamma function, RGMIA Research Report Collection 7 (2004), no. 3, Article 14, 487–494; Available online at http://rgmia.org/v7n3.php.
      9. Jian-She Sun, Sequence inequalities for the logarithmic convex (concave) function, Communications in Mathematical Analysis 1 (2006), no. 1, 6–11.
      10. Jian-She Sun, Sequence inequalities for the logarithmic convex (concave) function, RGMIA Research Report Collection 7 (2004), no. 4, Article 2, 549–554; Available online at http://rgmia.org/v7n4.php.
      11. 徐增堃,Alzer不等式的进一步推广,浙江师范大学学报(自然科学版)25 (2002), no. 3, 217–220.
      12. Jeong-Sheok Ume, An inequality for a positive real function, Mathematical Inequalities and Applications 5 (2002), no. 4, 693–696.
      13. Zheng Liu, New generalization of H. Alzer’s inequality, Tamkang Journal of Mathematics 34 (2003), no. 3, 255–260.
      14. Zeng-Kun Xu and Da-Peng Xu, A general form of Alzer’s inequality, Computers and Mathematics with Applications 44 (2002), 365–373.
  2. Feng Qi, Inequalities for a multiple integral, Acta Mathematica Hungarica 84 (1999), no. 1-2, 19–26; Available online at http://dx.doi.org/10.1023/A:1006642601341.
    • Cited by-被引用情况
      1. 匡继昌,常用不等式,第三版,山东科学技术出版社,2004年,第560页。
  3. Feng Qi and Chao-Ping Chen, Monotonicities of two sequences, Mathematics and Informatics Quarterly 9 (1999), no. 4, 136–139.
    • Cited by-被引用情况
      1. Jian-She Sun, Further generalizations of inequalities and monotonicity for the ratio of gamma function, International Journal Applied Mathematical Sciences 2 (2005), no. 2, 248–257.
  4. Feng Qi, Li-Hong Cui and Sen-Lin Xu, Some inequalities constructed by Tchebysheff’s integral inequality, Mathematical Inequalities and Applications 2 (1999), no. 4, 517–528.
    • Cited by-被引用情况
      1. Yuyang Qiu and Ling Zhu, The best approximation of the sinc function by a polynomial of degree $n$ with the square norm, Journal of Inequalities and Applications 2010 (2010), Article ID 307892, 12 pages; Available online at http://dx.doi.org/10.1155/2010/307892.
      2. Ling Zhu, Jordan type inequalities involving the Bessel and modified Bessel functions, Computers and Mathematics with Applications 59 (2010), no. 2, 724–736.
      3. Ling Zhu, A general form of Jordan-type double inequality for the generalized and normalized Bessel functions, Applied Mathematics and Computation 215 (2010), no. 11, 3802–3810.
      4. R. Klén, M. Lehtonen and M. Vuorinen, On Jordan type inequalities for hyperbolic functions, Available online at http://arxiv.org/abs/0808.1493.
      5. Ling Zhu and Jinju Sun, Six new Redheffer-type inequalities for circular and hyperbolic functions, Computers and Mathematics with Applications 56 (2008), no. 2, 522–529; Available online at http://dx.doi.org/10.1016/j.camwa.2008.01.012.
      6. Ling Zhu, A general form of Jordan’s inequalities and its applications, Mathematical Inequalities and Applications 11 (2008), no. 4, 655–665.
      7. Árpád Baricz, Some inequalities involving generalized Bessel functions, Mathematical Inequalities and Applications 10 (2007), no. 4, 827–842.
      8. Zhen-Gang Xiao, Zhi-Hua Zhang, V. Lokesha and K. M. Nagaraja, Two-parameter generalized weighted functional mean, RGMIA Research Report Collection 9 (2006), no. 1, Article 13, 131–140; Available online at http://rgmia.org/v9n1.php.
      9. József Sándor, A note on certain Jordan type inequalities, RGMIA Research Report Collection 10 (2007), no. 1, Article 8; Available online at http://rgmia.org/v10n1.php.
      10. 刘爱启,王刚,李伟,含有三角函数的Wilker不等式的新证明,焦作工学院学报(自然科学版)21 (2002), no. 5, 401–403.
      11. 匡继昌,常用不等式,第三版,山东科学技术出版社,2004年,第599页,第603页。
      12. Ling Zhu, Sharpening of Jordan’s inequalities and its applications, Mathematical Inequalities and Applications 9 (2006), no. 1, 103–106.
      13. Liang-Cheng Wang, Li-Hong Liu and Xiu-Fen Ma, Three mappings related to Chebyshev-type inequalities, Journal of Inequalities in Pure and Applied Mathematics 9 (2008), no. 4, Article 113; Available online at http://www.emis.de/journals/JIPAM/article1048.html.
      14. P. S. Bullen, A Dictionary of Inequalities, Supplement, RGMIA Monographs, pages 7, 11, 43, and 53; Available online at http://rgmia.org/monographs/bullen.html.
      15. M. Bencze, About Seiffert’s mean, RGMIA Research Report Collection 3 (2000), no. 4, 681–707; Available online at http://rgmia.org/v3n4.php.
      16. 王良成,由Chebyshev型不等式生成的差的单调性,四川大学学报(自然科学版)39 (2002), no. 3, 398–403.
  5. Feng Qi and Sen-Lin Guo, Inequalities for the incomplete gamma and related functions, Mathematical Inequalities and Applications 2 (1999), no. 1, 47–53.
    • Cited by-被引用情况
      1. Jian-She Sun, Further generalizations of inequalities and monotonicity for the ratio of gamma function, International Journal Applied Mathematical Sciences 2 (2005), no. 2, 248–257.
      2. Tie-Hong Zhao, Yu-Ming Chu, and Hua Wang, Logarithmically complete monotonicity properties relating to the gamma function, Abstract and Applied Analysis 2011 (2011), Article ID 896483, 13 pages; Available online at http://dx.doi.org/10.1155/2011/896483.
      3. Tie-Hong Zhao and Yu-Ming Chu, A class of logarithmically completely monotonic functions associated with a gamma function, Journal of Inequalities and Applications 2010 (2010), Article ID 392431, 11 pages; Available online at http://dx.doi.org/10.1155/2010/392431.
      4. Miao-Qing An, Logarithmically complete monotonicity and logarithmically absolute monotonicity properties for the gamma function, Communications in Mathematical Analysis 6 (2009), no. 2, 69–78.
      5. Arcadii Z. Grinshpan, Weighted integral and integro-differential inequalities, Advances in Applied Mathematics 41 (2008), 227–246.
      6. Tibor K. Pogány and Živorad Tomovski, On Mathieu-type series whose terms contain generalized hypergeometric function ${}_pF_q$ and Meijer’s $G$-function, Mathematical and Computer Modelling 47 (2008), no. 9-10, 952–969.
      7. A. Laforgia and P. Natalini, Supplements to known monotonicity results and inequalities for the gamma and incomplete gamma functions, Journal of Inequalities and Applications 2006 (2006), Article ID 48727, 1–8.
      8. 匡继昌,一般不等式研究在中国的新进展,北京联合大学学报(自然科学版)19 (2005), no. 1, 33–41.
      9. 匡继昌,常用不等式,第三版,山东科学技术出版社,2004年,第599页。
      10. Pierpaolo Natalini and Biagio Palumbo, Inequalities for the incomplete gamma function, Mathematical Inequalities and Applications 3 (2000), no. 1, 69–77.
      11. Jian-She Sun, Monotonicity results and inequalities involving the gamma function, RGMIA Research Report Collection 7 (2004), no. 3, Article 14, 487–494; Available online at http://rgmia.org/v7n3.php.
      12. Árpád Elbert and Andrea Laforgia, An inequality for the product of two integrals relating to the incomplete Gamma function, Journal of Inequalities and Applications 5 (2000), 39–51.
      13. Sever S. Dragomir and Charles E. M. Pearce, Selected Topics on Hermite-Hadamard Type Inequalities and Applications, RGMIA Monographs, Victoria University, 2000; Available online at http://rgmia.org/monographs/hermite_hadamard.html.
      14. Giampietro Allasia, Carla Giordano and Josip Pe\v{cari\’c, Hadamard-type inequalities for $(2r)$-convex functions with applications, Atti Accad. Sci. Torino Cl. Sci. Fis Mat Natur. 133 (1999), 187–200.
      15. S. S. Dragomir, R. P. Agarwal and N. S. Barnett, Inequalities for Beta and Gamma functions via some classical and new integral inequalities, Journal of Inequalities and Applications 5 (2000), 103–165.
  6. Feng Qi and Qiu-Ming Luo, Refinements and extensions of an inequality, Mathematics and Informatics Quarterly 9 (1999), no. 1, 23–25.
    • Cited by-被引用情况
      1. S. S. Dragomir, On some new inequalities of Hermite-Hadamard type for $m$-convex functions, Tamkang Journal of Mathematics 33 (2002), no. 1, 45–55.
      2. Zhen-Gang Xiao, Zhi-Hua Zhang, V. Lokesha and Rong Tang, Two-parameters the mean of $n$ variables, International Review of Pure and Applied Mathematics 1 (2005), no. 1, 93–111.
      3. P. S. Bullen, Handbook of Means and Their Inequalities, Mathematics and its Applications, Volume 560, page xvi, Kluwer Academic Publishers, 2003.
      4. Sever S. Dragomir and Charles E.M. Pearce, Selected Topics on Hermite-Hadamard Type Inequalities and Applications, RGMIA Monographs, Victoria University, 2000; Available online at http://rgmia.org/monographs/hermite_hadamard.html.
  7. Feng Qi and Jia-Qiang Mei, Some inequalities of the incomplete gamma and related functions, Zeitschrift für Analysis und ihre Anwendungen 18 (1999), no. 3, 793–799; available online at https://doi.org/10.4171/ZAA/914.
    • Cited by-被引用情况
      1. Jian-She Sun, Further generalizations of inequalities and monotonicity for the ratio of gamma function, International Journal Applied Mathematical Sciences 2 (2005), no. 2, 248–257.
      2. Tie-Hong Zhao, Yu-Ming Chu, and Hua Wang, Logarithmically complete monotonicity properties relating to the gamma function, Abstract and Applied Analysis 2011 (2011), Article ID 896483, 13 pages; Available online at http://dx.doi.org/10.1155/2011/896483.
      3. Tie-Hong Zhao and Yu-Ming Chu, A class of logarithmically completely monotonic functions associated with a gamma function, Journal of Inequalities and Applications 2010 (2010), Article ID 392431, 11 pages; Available online at http://dx.doi.org/10.1155/2010/392431.
      4. Arcadii Z. Grinshpan, Weighted integral and integro-differential inequalities, Advances in Applied Mathematics 41 (2008), 227–246.
  8. Feng Qi, Sen-Lin Xu and Lokenath Debnath, A new proof of monotonicity for extended mean values, International Journal of Mathematics and Mathematical Sciences 22 (1999), no. 2, 417–421; Available online at http://dx.doi.org/10.1155/S0161171299224179.
    • Cited by-被引用情况
      1. Huan-Nan Shi and Shan-He Wu, Refinement of an inequality for the generalized logarithmic mean, RGMIA Research Report Collection 10 (2007), no. 1, Article 13; Available online at http://rgmia.org/v10n1.php.
      2. S. S. Dragomir, On some new inequalities of Hermite-Hadamard type for $m$-convex functions, Tamkang Journal of Mathematics 33 (2002), no. 1, 45–55.
      3. Alfred Witkowski, An even easier proof on monotonicity of Stolarsky means, RGMIA Research Report Collection 13 (2010), no. 1, Article 4; Available online at http://rgmia.org/v13n1.php.
      4. Chao-Ping Chen, The monotonicity of the ratio between Stolarsky means, RGMIA Research Report Collection 11 (2008), no. 4, Article 15; Available online at http://rgmia.org/v11n4.php.
      5. Chao-Ping Chen, Stolarsky and Gini means, RGMIA Research Report Collection 11 (2008), no. 4, Article 11; Available online at http://rgmia.org/v11n4.php.
      6. 王良成,双加权广义抽象平均值及其不等式,四川大学学报自然科学版2003年第40卷第4期618–621页。
      7. Ákos Császár, Zoltán Daróczy, Imre Kátai and András Prékopa, A recommendation of Prof. and Dr. Zsolt Páles for the corresponding membership of the Hungarian Academy of Sciences. (Hungarian)
      8. Zhen-Gang Xiao, Zhi-Hua Zhang, V. Lokesha and Rong Tang, Two-parameters the mean of $n$ variables, International Review of Pure and Applied Mathematics 1 (2005), no. 1, 93–111.
      9. Zhen-Gang Xiao, Zhi-Hua Zhang, V. Lokesha and K. M. Nagaraja, Two-parameter generalized weighted functional mean, RGMIA Research Report Collection 9 (2006), no. 1, Article 13, 131–140; Available online at http://rgmia.org/v9n1.php.
      10. 郭白妮,凸函数的双参数平均不等式的新证明,工科数学 18 (2002), no. 5, 75–78.
      11. 林永伟,王爱芹,杨士俊,某些平均值不等式的注记,杭州师范学院学报(自然科学版)2 (2003), no. 1, 26–29.
      12. Liang-Cheng Wang, Li-Hong Liu and Xiu-Fen Ma, Three mappings related to Chebyshev-type inequalities, Journal of Inequalities in Pure and Applied Mathematics 9 (2008), no. 4, Article 113; Available online at http://www.emis.de/journals/JIPAM/article1048.html.
      13. X. Li and R. N. Mohapatra, Extended means as weighted means, Proceedings of the Royal Society of London Series A—Mathematical, Physical and Engineering Sciences 457 (2001), no. 2009, 1273–1275.
      14. P. S. Bullen, Handbook of Means and Their Inequalities, Mathematics and its Applications, Volume 560, page 395, Kluwer Academic Publishers, 2003.
      15. Sever S. Dragomir and Charles E.M. Pearce, Selected Topics on Hermite-Hadamard Type Inequalities and Applications, RGMIA Monographs, Victoria University, 2000; Available online at http://rgmia.org/monographs/hermite_hadamard.html.
      16. 王良成, 由Chebyshev型不等式生成的差的单调性,四川大学学报(自然科学版)  39 (2002), no. 3, 398–403.
      17. Alfred Witkowski, Weighted extended mean values, Colloquium Mathematicum 100 (2004), no. 1, 111–117.
      18. Alfred Witkowski, Weighted extended mean values, RGMIA Research Report Collection 7 (2004), no. 1, Article 6; Available online at http:/rgmia.org/v7n1.php.
  9. Feng Qi and Shi-Qin Zhang, Note on monotonicity of generalized weighted mean values, Proceedings of the Royal Society of London Series A—Mathematical, Physical and Engineering Sciences 455 (1999), no. 1989, 3259–3260; Available online at http://dx.doi.org/10.1098/rspa.1999.0449.
    • Cited by-被引用情况
      1. Alfred Witkowski, An even easier proof on monotonicity of Stolarsky means, RGMIA Research Report Collection 13 (2010), no. 1, Article 4; Available online at http://rgmia.org/v13n1.php.
      2. Zhen-Gang Xiao, Zhi-Hua Zhang, V. Lokesha and Rong Tang, Two-parameters the mean of $n$ variables, International Review of Pure and Applied Mathematics 1 (2005), no. 1, 93–111.
      3. Zhen-Gang Xiao, Zhi-Hua Zhang, V. Lokesha and K. M. Nagaraja, Two-parameter generalized weighted functional mean, RGMIA Research Report Collection 9 (2006), no. 1, Article 13, 131–140; Available online at http://rgmia.org/v9n1.php.
      4. 郭白妮,凸函数的双参数平均不等式的新证明,工科数学 18 (2002), no. 5, 75–78.
      5. 林永伟,王爱芹,杨士俊,某些平均值不等式的注记,杭州师范学院学报(自然科学版)2 (2003), no. 1, 26–29.
      6. 匡继昌,一般不等式研究在中国的新进展,北京联合大学学报(自然科学版)19 (2005), no. 1, 33–41.
      7. P. S. Bullen, Handbook of Means and Their Inequalities, Mathematics and its Applications, Volume 560, page 375 and 395, Kluwer Academic Publishers, 2003.
      8. X. Li and R. N. Mohapatra, Extended means as weighted means, Proceedings of the Royal Society of London Series A—Mathematical, Physical and Engineering Sciences 457 (2001), no. 2009, 1273–1275.
  10. Sen-Lin Guo and Feng Qi, Recursion formulae for $\sum\limits_{m=1}^nm^k$, Zeitschrift für Analysis und ihre Anwendungen 18 (1999), no. 4, 1123–1130; available online at https://doi.org/10.4171/ZAA/933.
    • Cited by-被引用情况
      1. 刘爱启,王刚,李伟,含有三角函数的Wilker不等式的新证明,焦作工学院学报(自然科学版)21 (2002), no. 5, 401–403.
      2. Eric W. Weisstein, Power Sum, From MathWorld–A Wolfram Web Resource. http://mathworld.wolfram.com/PowerSum.html.
  11. Mei Jia-Qiang, Xu Sen-Lin and Qi Feng, Curvature pinching for minimal submanifolds in unit spheres, Mathematica Applicata 12 (1999), no. 3, 5–10.
  12. Xu Sen-Lin, Huang Zheng and Qi Feng, A rigidity theorem for manifold with a nice submanifold, Mathematica Applicata 12 (1999), no. 1, 72–75.
  13. 郭白妮,张士勤,祁锋,双参数拓广平均单调性的一个简单证明,数学的实践与认识 29 (1999), no. 2, 169–174.
    • Cited by-被引用情况
      1. Zhen-Hang Yang, On the monotonicity and log-convexity of a four-parameter homogeneous mean, Journal of Inequalities and Applications 2008 (2008), Article ID 149286, 12 pages; Available online at http://dx.doi.org/10.1155/2008/149286.
      2. 曹丹丹,杨士俊,关于一些平均值的研究,杭州师范学院学报(自然科学版)4 (2005), no. 5, 356–359.
      3. 续铁权,函数的双参数平均的几个性质,数学的实践与认识 32 (2002), no. 5, 869–873.
      4. 杨镇杭,几何凸函数的对称拟算术平均不等式,北京联合大学学报(自然科学版)19 (2005), no. 3, 25–29.
      5. 杨镇杭,积分中值定理中间点比较及有关平均不等式,数学的实践与认识 35 (2005), no. 5, 194–201.
      6. 郭白妮,凸函数的双参数平均不等式的新证明,工科数学 18 (2002), no. 5, 75–78.
      7. Zhen-Hang Yang, On the homogeneous functions with two parameters and its monotonicity, Journal of Inequalities in Pure and Applied Mathematics 6 (2005), no. 4, Article 101; Available online at http://www.emis.de/journals/JIPAM/article575.html.
      8. Zhen-Hang Yang, On the homogeneous functions with two parameters and its monotonicity, RGMIA Research Report Collection 8 (2005), no. 2, Article 10; Available online at http://rgmia.org/v8n2.php.
      9. 王良成,由Chebyshev型不等式生成的差的单调性,四川大学学报(自然科学版) 39 (2002), no. 3, 398–403.
  14. 夏大峰,徐森林,祁锋,非正截曲率的完备Riemann流形在无穷远截曲率趋于零的条件,数学研究与评论 19 (1999), no. 4, 747–752.

Thirteen preprints announced in 1999

1999年以预印本形式发表的13篇论文

  1. Feng Qi, An algebraic inequality, RGMIA Research Report Collection 2 (1999), no. 1, Article 8, 81–83; Available online at http://rgmia.org/v2n1.php.
    • Cited by-被引用情况
      1. Jian-She Sun, Further generalizations of inequalities and monotonicity for the ratio of gamma function, International Journal Applied Mathematical Sciences 2 (2005), no. 2, 248–257.
      2. Bogdan Gavrea and Ioan Gavrea, An inequality for linear positive functionals, Journal of Inequalities in Pure and Applied Mathematics 1 (2000), no. 1, Article 5; Available online at http://www.emis.de/journals/JIPAM/article98.html.
  2. Feng Qi, Generalized abstracted mean values, RGMIA Research Report Collection 2 (1999), no. 5, Article 4, 633–642; Available online at http://rgmia.org/v2n5.php.
  3. Feng Qi, Generalizations of Alzer’s and Kuang’s inequality, RGMIA Research Report Collection 2 (1999), no. 6, Article 12, 891–895; Available online at http://rgmia.org/v2n6.php.
    • Cited by-被引用情况
      1. Jian-She Sun, Further generalizations of inequalities and monotonicity for the ratio of gamma function, International Journal Applied Mathematical Sciences 2 (2005), no. 2, 248–257.
  4. Feng Qi, Inequalities and monotonicity of sequences involving $\sqrt[n]{(n+k)!/k!}$, RGMIA Research Report Collection 2 (1999), no. 5, Article 8, 685–692; Available online at http://rgmia.org/v2n5.php.
    • Cited by-被引用情况
      1. Jian-She Sun, Further generalizations of inequalities and monotonicity for the ratio of gamma function, International Journal Applied Mathematical Sciences 2 (2005), no. 2, 248–257.
  5. Feng Qi, Inequalities for a weighted multiple integral, RGMIA Research Report Collection 2 (1999), no. 7, Article 4, 991–997; Available online at http://rgmia.org/v2n7.php.
  6. Feng Qi, Logarithmic convexities of the extended mean values, RGMIA Research Report Collection 2 (1999), no. 5, Article 5, 643–652; Available online at http://rgmia.org/v2n5.php.
  7. Feng Qi, Monotonicity results and inequalities for the gamma and incomplete gamma functions, RGMIA Research Report Collection 2 (1999), no. 7, Article 7, 1027–1034; Available online at http://rgmia.org/v2n7.php.
    • Cited by-被引用情况
      1. Jian-She Sun, Further generalizations of inequalities and monotonicity for the ratio of gamma function, International Journal Applied Mathematical Sciences 2 (2005), no. 2, 248–257.
  8. Feng Qi, Several integral inequalities, RGMIA Research Report Collection 2 (1999), no. 7, Article 9, 1039–1042; Available online at http://rgmia.org/v2n7.php.
  9. Feng Qi and Qiu-Ming Luo, Generalization of H. Minc and L. Sathre’s inequality, RGMIA Research Report Collection 2 (1999), no. 6, Article 14, 909–912; Available online at http://rgmia.org/v2n6.php.
    • Cited by-被引用情况
      1. Jian-She Sun, Further generalizations of inequalities and monotonicity for the ratio of gamma function, International Journal Applied Mathematical Sciences 2 (2005), no. 2, 248–257.
  10. Feng Qi, Jia-Qiang Mei and Sen-Lin Xu, Other proofs of monotonicity for generalized weighted mean values, RGMIA Research Report Collection 2 (1999), no. 4, Article 6, 469–472; Available online at http://rgmia.org/v2n4.php.
    • Cited by-被引用情况
      1. Zlatokrilov Haim, Packet dispersion and the quality of voice over IP Applications in IP networks, Thesis under the supervision of Professor Hanoch Levy and submitted in partial fulfillment of the requirements for the M.Sc. degree in the Department of Computer Science, Tel-Aviv University, May 2003.
      2. Hanoch Levy and Haim Zlatokrilov, The effect of packet dispersion on voice applications in IP networks, IEEE-ACM Transactions on Networking 14 (2006), no. 2, 277–288.
      3. Alfred Witkowski, Monotonicity of generalized weighted mean values, Colloquium Mathematicum 99 (2004), no. 2, 203–206.
      4. Alfred Witkowski, Monotonicity of generalized weighted mean values, RGMIA Research Report Collection 7 (2004), no. 1, Article 12; Available online at http:/rgmia.org/v7n1.php.
      5. P. S. Bullen, Handbook of Means and Their Inequalities, Mathematics and its Applications, Volume 560, page 395, Kluwer Academic Publishers, 2003.
  11. Feng Qi and Ying-Jie Zhang, Inequalities for a weighted integral, RGMIA Research Report Collection 2 (1999), no. 7, Article 2, 967–975; Available online at http://rgmia.org/v2n7.php.
  12. Bai-Ni Guo and Feng Qi, Inequalities for generalized weighted mean values of convex function, RGMIA Research Report Collection 2 (1999), no. 7, Article 11, 1059–1065; Available online at http://rgmia.org/v2n7.php.
  13. Da-Feng Xia, Sen-Lin Xu and Feng Qi, A proof of the arithmetic mean-geometric mean-harmonic mean inequalities, RGMIA Research Report Collection 2 (1999), no. 1, Article 10, 99–102.
    • Cited by-被引用情况
      1. Zlatokrilov Haim, Packet dispersion and the quality of voice over IP Applications in IP networks, Thesis under the supervision of Professor Hanoch Levy and submitted in partial fulfillment of the requirements for the M.Sc. degree in the Department of Computer Science, Tel-Aviv University, May 2003.Hanoch Levy and Haim Zlatokrilov, The effect of packet dispersion on voice applications in IP networks, IEEE-ACM Transactions on Networking 14 (2006), no. 2, 277–288.

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