A 0-1 Law for Multifractal Spectra via the HGDS Scale Derivative

Abstract

We prove that the multifractal spectrum D(h,omega) of a stochastic process is almost surely deterministic under a scale decorrelation condition on the HGDS scale derivative. The key difficulty is that the pointwise Hölder exponent lives in the germ sigma-algebra, where classical 0-1 laws do not reach. We get around this by working with the geometry accumulation integral GLambda, which is a genuine Lebesgue integral over scales and concentrates almost surely. The boundary case -- log-correlated fields -- is sharp: the variance summability condition fails exactly there.