Central limit theorem under variance uncertainty

Abstract

We prove the central limit theorem (CLT) for a sequence of independent zero-mean random variables j, perturbed by predictable multiplicative factors λj with values in intervals [λj,λj]. It is assumed that the sequences λj, λj are bounded and satisfy some stabilization condition. Under the classical Lindeberg condition we show that the CLT limit, corresponding to a "worst" sequence λj, is described by the solution v of one-dimensional G-heat equation. The main part of the proof follows Peng's approach to the CLT under sublinear expectations, and utilizes H\"older regularity properties of v. Under the lack of such properties, we use the technique of half-relaxed limits from the theory of viscosity solutions.