Intermittency of geometric Brownian motion on SL(n)

Abstract

This short note is motivated by a recently discovered connection between a drift-diffusion process in n-dimensional Euclidean space with a divergence-free drift sampled from a stationary and isotropic Gaussian ensemble of critical scaling on the one hand, and a geometric Brownian motion on SL(n) on the other hand. This can be seen as a tensorial form of a stochastic exponential; it thus is naturally intermittent, which transfers to the pair distance of the drift-diffusion process. In this note, we quantify the intermittency of the geometric Brownian motion \Fτ\τ0 on SL(n) also in dimensions n>2. We do so in two (related) ways: 1) by identifying the exponential growth rate for the 2p-th stochastic moment E|Fτ|2p with its anomalous dependence on p (and n), and 2) by quantifying a non-tightness of |Fτ|2/E|Fτ|2 as τ∞. It is the second property that transmits to the drift-diffusion process. The arguments rely on stochastic analysis: We write \Fτ\τ≥ 0 as the solution of dF=Fτ dB with \Bτ\τ≥ 0 a Brownian motion on the Lie algebra sl(n). The arguments leverage isotropy: The diffusion projects onto the spectrum of the Gram matrix G=F*F, as captured by trGp.