Extreme-Value Criticality and Gain Decomposition at the Integer Quantum Hall Transition

Abstract

Extreme-value fluctuations at quantum critical points remain poorly understood in the presence of strong correlations and openness. At the integer quantum Hall transition in the open Chalker--Coddington network, we show that the maximal wave-function amplitude separates into a global gain and an intrinsic extreme component, |ψ|=A\,|ψ|. We introduce extreme-moment scaling for |ψ| and observe an approximately parabolic exponent function τ(q) over moderate q, while |ψ| displays an almost Gaussian bulk over the studied sizes. The gain factor is close to log-normal and largely controls the raw extremes. Gain normalization reorganizes the statistics: τ(q) changes qualitatively and |ψ| does not support a single-parameter generalized extreme-value collapse under standard centering/scaling in the accessible size window. Extreme observables thus provide a robust probe of correlated criticality in open quantum systems.

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