| 1. | Empirical likelihood confidence intervals for quantiles under - mixing samples
混合样本下分位数的经验似然置信区间 |
| 2. | Results : the optimal pool size , programming of matlab , and the steps of trials of the 2 approaches were given
结果:给出了最小检测次数法和序贯检验法的最优混合样本计算方法、 matlab程序和具体操作步骤。 |
| 3. | As a result , the classified accuracy of training samples were increasing while the training samples were increasing
结果发现不论为何种混合样本资料,分类正确率会随著训练?例样本数的增加而呈现递增的趋势。 |
| 4. | As a result , the classified accuracy of training samples were increasing while the training samples were increasing
结果发现不论为何种混合样本资料,分类正确率会随着训练示范样本数的增加而呈现递增的趋势。 |
| 5. | The optimal pool sizes of the 2 approaches were given by minimizing the expected pooled sample size ; computer simulation was used to verify the outcomes
对最大期望检测次数进行数学优化,求解最优混合样本的大小,并通过计算机模拟对有关结果进行验证。 |
| 6. | When the number of the training samples were on the two numbers , 200 and 250 , the classified accuracy was irregular , and the difference between these two number was not significant
在实验设计上,先产生三种混合样本资料,以比较在各种不同的实验设计下,学习向量量化网路分类正确性之差异。 |
| 7. | Whether the government will consider allowing hotels to connect different wastewater outlets to a single outlet so that a joint sample reading of the different categories of wastewater can be taken
会否考虑让设有多个排污出口的酒店将各出口连接,以便在不同类别的污水中取得混合样本的数据? |
| 8. | Objective : to provide a minimum sample size approach and a sequential sampling approach for testing whether the sporozoite rate has exceeded the critical level of malaria epidemics using the pool sampling method
摘要目的:给出基于混合样本的最小检测次数法和序贯检验法,以检验子孢子阳性率是否超过导致疟疾流行的临界水平。 |
| 9. | Conclusion : the optimal pool size in the present study can obtain satisfactory testing power ( type and type errors are both lower than 5 % ) and can effectively decrease the pooled sample size
结论:利用本文给出的最优混合样本和检测步骤,在获得比较满意的检验功效(两类错误概率均低于5 % )的同时,可以有效降低检测次数。 |
| 10. | Abstract : the empirical likelihood confidence intervals for quantiles are constructed under a - mixing sample , which are based on the result that the blockwise empirical likelihood ratio statistic asymptotically has the 2 ( 1 ) distribution
文摘:在一定的条件下证明了-混合样本下分位数的分组经验似然比统计量的渐近分布为2 ( 1 ) ,由此可构造分位数的经验似然置信区间 |
