Circular Kardar-Parisi-Zhang interfaces evolving out of the plane

Abstract

Circular KPZ interfaces spreading radially in the plane have GUE Tracy-Widom (TW) height distribution (HD) and Airy2 spatial covariance, but what are their statistics if they evolve on the surface of a different background space, such as a bowl, a cup, or any surface of revolution? To give an answer to this, we report here extensive numerical analyses of several one-dimensional KPZ models on substrates whose size enlarges as L(t) = L0+ω tγ, while their mean height h increases as usual [ h t]. We show that the competition between the L enlargement and the correlation length ( c t1/z) plays a key role in the asymptotic statistics of the interfaces. While systems with γ>1/z have HDs given by GUE and the interface width increasing as w tβ, for γ<1/z the HDs are Gaussian, in a correlated regime where w tα γ. For the special case γ=1/z, a continuous class of distributions exists, which interpolate between Gaussian (for small ω/c) and GUE (for ω/c 1). Interestingly, the HD seems to agree with the Gaussian symplectic ensemble (GSE) TW distribution for ω/c ≈ 10. Despite the GUE HDs for γ>1/z, the spatial covariances present a strong dependence on the parameters ω and γ, agreeing with Airy2 only for ω 1, for a given γ, or when γ=1, for a fixed ω. These results considerably generalize our knowledge on the 1D KPZ systems, unveiling the importance of the background space in their statistics.