Department of Anesthesiology, Far Eastern Memorial Hospital, Banqiao, New Taipei City, Taiwan, 220.
Department of Electrical Engineering, Yuan Ze University, Taoyuan, Taiwan, 320.
J Med Syst. 2024 Jun 1;48(1):58. doi: 10.1007/s10916-024-02073-z.
Modern anesthetic drugs ensure the efficacy of general anesthesia. Goals include reducing variability in surgical, tracheal extubation, post-anesthesia care unit, or intraoperative response recovery times. Generalized confidence intervals based on the log-normal distribution compare variability between groups, specifically ratios of standard deviations. The alternative statistical approaches, performing robust variance comparison tests, give P-values, not point estimates nor confidence intervals for the ratios of the standard deviations. We performed Monte-Carlo simulations to learn what happens to confidence intervals for ratios of standard deviations of anesthesia-associated times when analyses are based on the log-normal, but the true distributions are Weibull. We used simulation conditions comparable to meta-analyses of most randomized trials in anesthesia, and coefficients of variation . The estimates of the ratios of standard deviations were positively biased, but slightly, the ratios being 0.11% to 0.33% greater than nominal. In contrast, the 95% confidence intervals were very wide (i.e., > 95% of P ≥ 0.05). Although substantive inferentially, the differences in the confidence limits were small from a clinical or managerial perspective, with a maximum absolute difference in ratios of 0.016. Thus, P < 0.05 is reliable, but investigators should plan for Type II errors at greater than nominal rates.
现代麻醉药物确保了全身麻醉的效果。目标包括减少手术、气管拔管、麻醉后护理单元或术中反应恢复时间的变异性。基于对数正态分布的广义置信区间比较组间的变异性,特别是标准差的比值。替代的统计方法,进行稳健方差比较检验,给出 P 值,而不是标准差比值的点估计或置信区间。我们进行了蒙特卡罗模拟,以了解当分析基于对数正态分布,但真实分布为威布尔分布时,麻醉相关时间的标准差比值的置信区间会发生什么情况。我们使用了与麻醉中大多数随机试验的荟萃分析可比的模拟条件,以及变异系数 。估计的标准差比值存在正偏差,但很小,比值比名义值高 0.11%至 0.33%。相比之下,95%置信区间非常宽(即,超过 95%的 P 值≥0.05)。尽管从推理上看,从临床或管理的角度来看,置信限的差异很小,最大的比值差异为 0.016。因此,P 值<0.05 是可靠的,但研究人员应计划以高于名义的比率出现第二类错误。