Обнаружение аномальных измерений при обработке данных малого объема
This article describes the criteria for detection of outliers power depending on a small size sample. Removing outliers is one of the stages of signals pre-processing. A statistical experiment, in which using a random number generator were received arrays of data, containing several thousand samples...
Збережено в:
| Дата: | 2016 |
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| Автор: | |
| Формат: | Стаття |
| Мова: | Ukrainian |
| Опубліковано: |
PE "Politekhperiodika", Book and Journal Publishers
2016
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| Теми: | |
| Онлайн доступ: | https://www.tkea.com.ua/index.php/journal/article/view/TKEA2016.4-5.42 |
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| Назва журналу: | Technology and design in electronic equipment |
Репозитарії
Technology and design in electronic equipment| Резюме: | This article describes the criteria for detection of outliers power depending on a small size sample. Removing outliers is one of the stages of signals pre-processing. A statistical experiment, in which using a random number generator were received arrays of data, containing several thousand samples with normal distribution, with the given mean averages and standard deviation for each n-value, was conducted to solve this problem. Thus, we researched and vividly illustrated the possibility of Grubbs, Dixon, Tietjen — Moore, Irving, Chauvenet, Lvovsky and Romanovsky criteria at studied data sizes from 5 to 20 meterages. Conclusions about the applicability of each criterion for the outliersdetection in processing of small size data were made. Lvovsky criterion was recognized the optimal criterion. Dixon’s criterion was recommended for n ≤ 10. Irwin’s criterion was recommended when n ≥ 10. Tietjen—Moore’scriterion can be recommended for the detection of outliers in small samples for n > 5, since it recognizes errors well in the values of a ¯x + 4σ and has the least amount of I type mistakes. Grubb’s with an unknown standard deviation may be used in samples for n ≥ 15. Chauvenet and Romanovsky criteria cannot be recommended for the detection of outliers in small size data. |
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