KPZ-like scaling on a high-dimensional hypersphere

Abstract

We consider the orientational diffusion controlled by the hyperspherical Laplacian, ∇2D, on the surface of the D--dimensional hypersphere in the limit D ∞. We find that for stretched paths with lengths relatively short compared to the hypersphere's radius, the finite-size corrections in orientational correlations are controlled by the Kardar-Parisi-Zhang (KPZ) scaling exponent, γ = 1/3. In addition, we speculate about the topology of the orientational target space representing the surface of the hypersphere.

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