JIPAM
| Note on Feng Qi's Integral Inequality | ||||
| Authors: | Josip E. Pecaric, T. Pejkovic, | |||
| Keywords: | Integral inequality. | |||
| Date Received: | 20/01/04 | |||
| Date Accepted: | 27/04/04 | |||
| Subject Codes: |
26D15 |
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| Editors: | Feng Qi, | |||
| Abstract: |
We give a generalization of Feng Qi's result from [5] by showing that if a function | |||
![$ finmathrm{C}^1([a,b])$](images/084_04_JIPAM/img1.gif){kind=small}
satisfies 
and 
for ![$ xin[a,b]$](images/084_04_JIPAM/img4.gif){kind=small}
and a positive integer 
then ![$ {int_{a}^{b}{[f(x)]}^{n+2}d{x}}geq {left(int_{a}^{b}{f(x)}d{x}% right)}^{n+1}$](images/084_04_JIPAM/img6.gif)
holds. This follows from our answer to Feng Qi's open problem. ;
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http://jipam.vu.edu.au/article.php?sid=418