We prove that given a computable metric space and two computable measures, the set of points that have high universal uniform test scores with respect to the first measure will have a lower bound with respect to the second measure. This result is transferred to thermodynamics, showing that algorithmic thermodynamic entropy must oscillate in the presence of dynamics. Another application is that outliers will become emergent in computable dynamics of computable metric spaces.

翻译：我们证明，在给定可计算度量空间和两个可计算测度的情况下，关于第一个测度具有高通用一致性检验得分的点集将在第二个测度下存在下界。这一结果被迁移至热力学领域，表明在动力学存在时算法热力学熵必然发生振荡。另一应用是，在可计算度量空间的可计算动力学中，异常点将突现。