引力奇点
临界指数
物理
临界点(数学)
临界尺寸
量子
临界性
统计物理学
量子临界点
缩放比例
相变
量子相变
临界现象
维数(图论)
量子力学
数学
纯数学
数学分析
核物理学
几何学
作者
Thomas Vojta,José A. Hoyos
标识
DOI:10.1103/physrevlett.112.075702
摘要
We employ scaling arguments and optimal fluctuation theory to establish a general relation between quantum Griffiths singularities and the Harris criterion for quantum phase transitions in disordered systems. If a clean critical point violates the Harris criterion, it is destabilized by weak disorder. At the same time, the Griffiths dynamical exponent z' diverges upon approaching the transition, suggesting unconventional critical behavior. In contrast, if the Harris criterion is fulfilled, power-law Griffiths singularities can coexist with clean critical behavior, but z' saturates at a finite value. We present applications of our theory to a variety of systems including quantum spin chains, classical reaction-diffusion systems and metallic magnets, and we discuss modifications for transitions above the upper critical dimension. Based on these results we propose a unified classification of phase transitions in disordered systems.
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