Aragao Glaucia M F, Corradini Maria G, Normand Mark D, Peleg Micha
Department of Chemical and Food Engineering, Federal University of Santa Catarina, Florianopolis, Santa Catarina, Brazil.
Int J Food Microbiol. 2007 Nov 1;119(3):243-57. doi: 10.1016/j.ijfoodmicro.2007.08.004. Epub 2007 Aug 14.
Published survival curves of Escherichia coli in two growth media, with and without the presence of salt, at various temperatures and in a Greek eggplant salad having various levels of essential oil, all had a characteristic downward concavity when plotted on semi logarithmic coordinates. Some also exhibited what appeared as a 'shoulder' of considerable length. Regardless of whether a shoulder was noticed, the survival pattern could be considered as a manifestation of an underlying unimodal distribution of the cells' death times. Mathematically, the data could be described equally well by the Weibull and log normal distribution functions, which had similar modes, means, standard deviations and coefficients of skewness. When plotted in their probability density function (PDF) form, the curves also appeared very similar visually. This enabled us to quantify and compare the effect of temperature or essential oil concentration on the organism's survival in terms of these temporal distributions' characteristics. Increased lethality was generally expressed in a shorter mean and mode, a smaller standard deviation and increased overall symmetry as judged by the distributions' degree of skewness. The 'shoulder', as expected, simply indicated that the distribution's standard deviation was much smaller than its mode. Rate models based on the two distribution functions could be used to predict non isothermal survival patterns. They were derived on the assumption that the momentary inactivation rate is the isothermal rate at the momentary temperature at a time that corresponds to the momentary survival ratio. In this application, however, the Weibullian model with a fixed power was not only simpler and more convenient mathematically than the one based on the log normal distribution, but it also provided more accurate estimates of the dynamic inactivation patterns.
已发表的大肠杆菌在两种生长培养基中的存活曲线,一种有盐,一种无盐,在不同温度下以及在含有不同水平精油的希腊茄子沙拉中的存活曲线,当绘制在半对数坐标上时,都具有特征性的向下凹形。有些还表现出相当长的“肩部”。无论是否注意到肩部,存活模式都可被视为细胞死亡时间潜在单峰分布的一种表现。从数学上讲,威布尔分布函数和对数正态分布函数对数据的描述同样良好,它们具有相似的众数、均值、标准差和偏度系数。当以概率密度函数(PDF)形式绘制时,曲线在视觉上也非常相似。这使我们能够根据这些时间分布的特征来量化和比较温度或精油浓度对生物体存活的影响。致死率增加通常表现为平均和众数时间缩短、标准差减小以及根据分布的偏度程度判断的整体对称性增加。正如预期的那样,“肩部”仅仅表明分布的标准差远小于其众数。基于这两种分布函数的速率模型可用于预测非等温存活模式。它们是在瞬时失活速率是对应于瞬时存活比率的某个时间的瞬时温度下的等温速率这一假设下推导出来的。然而,在本应用中,具有固定幂次的威布尔模型在数学上不仅比基于对数正态分布的模型更简单、更方便,而且它还能提供更准确的动态失活模式估计。
