摘要: 当使用比较原则、 柯西判别法在讨论正项级数敛散性时，会遇到比值极限为1从而无法使用的情 况，典型的例子为数组{1/n}和{1/n²}的正项级数具有不同的敛散性。 本文讨论了形如1/n^a(α > 0) 正项级数的敛散性与对应点集的BOX维数存在一定关联，当点集的BOX维数大于等于1/2时，正项级数发散；小于1/2时，正项级数收敛，同时提出了利用1/n为参照对象判断数列正项级数敛散性的一种新方法。

Abstract: When using the comparison principle and cauchy discriminant method to discuss the convergence and divergence of positive series, we may encounter situations where the ratio limit is 1 and cannot be used. A typical example is that the positive series of arrays {1/n} and {1/n²} have different convergence and divergence. This article discusses the convergence and divergence of positive series in the form of 1/n^a(α > 0), which is related to the BOX dimension of the corresponding point set. When the BOX dimension of the point set is greater than or equal to 1/2, the positive series diverges; when it is less than 1/2, the positive series converges, and a new method is proposed to determine the convergence and divergence of the positive series of a sequence using 1/n as the reference object.