共 101 条
- [1] Chu Y.-M.(2012)Optimal combinations bounds of root-square and arithmetic means for Toader mean Proc. Indian Acad. Sci. Math. Sci. 122 41-51
- [2] Wang M.-K.(2014)The best bounds for Toader mean in terms of the centroidal and arithmetic means Filomat 28 775-780
- [3] Qiu S.-L.(2016)Sharp inequalities for bounding Seiffert mean in terms of the arithmetic, centroidal, and contra-harmonic means Math. Slovaca 66 1115-1118
- [4] Hua Y.(2017)Sharp bounds for a special quasi-arithmetic mean in terms of arithmetic and geometric means with two parameters J. Inequal. Appl. 2017 797-806
- [5] Qi F.(2014)Sharp bounds for Neuman–Sándor mean in terms of the convex combination of quadratic and first Seiffert means Acta Math. Sci. 34B 161-166
- [6] Jiang W.-D.(2012)Sharp bounds for Seiffert mean in terms of contraharmonic mean Abstr. Appl. Anal. 2012 237-242
- [7] Cao J.(2013)Sharp bounds for Toader mean in terms of contraharmonic mean with applications J. Math. Inequal. 7 665-675
- [8] Qi F.(2015)Sharp bounds for the Neuman–Sándor mean in terms of the power and contraharmonic means Cogent Math. 2 134-138
- [9] Qian W.-M.(2016)A double inequality for the combination of Toader mean and the arithmetic mean in terms of the contraharmonic mean Publ. Inst. Math. 99 1007-1017
- [10] Chu Y.-M.(2013)Bounds of the Neuman–Sándor mean using power and identric means Abstr. Appl. Anal. 2013 253-266