[老化的无单位数学值]。

Zeitschrift fur Gerontologie Pub Date : 1993-07-01

W Beier

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引用次数: 0

摘要

从老化的数学模型推导出三个无单元数。可以计算出数字beta t的临界值，其中beta表示衰老速率，t表示生物体的实际年龄。如果β t大于1.84，则达到理论寿命。采用迭代法计算另一个无单位数，即增长率和老化率β的商x，得到x = 4.5。

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[Unit-free mathematical values of aging].

From a mathematical model of aging are deduced three unit-free numbers. It is possible to calculate a critical value of the number beta t, where beta means the aging rate and t the chronological age of the organism. If beta t is greater than 1.84, then the theoretical life span is reached. Using an iteration method another unit-free number, namely, the quotient x of the growth rate and the aging rate beta is calculated to x = 4.5.

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来源期刊

Zeitschrift fur Gerontologie

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