Add to ORKGWe study the anisotropic version of the Hastings-Levitov model AHL$(\nu)$. Previous results have shown that on bounded time-scales the harmonic measure on the boundary of the cluster converges, in the small-particle limit, to the solution of a deterministic ordinary differential equation. We consider the evolution of the harmonic measure on time-scales which grow logarithmically as the particle size converges to zero and show that, over this time-scale, the leading order behaviour of the harmonic measure becomes random. Specifically, we show that there exists a critical logarithmic time window in which the harmonic measure flow, started from the unstable fixed point, moves stochastically from the unstable point towards a stable fixed point,...
AbstractThe Hastings–Levitov process HL(α) describes planar random compact subsets by means of rando...
We study the fluctuations of the outer domain of Hastings–Levitov clusters in the small particle lim...
We construct and study a stationary version of the Hastings–Levitov(0)(0) model. We prove that, unli...
We consider a variation of the standard Hastings-Levitov model HL(0), in which growth is anisotropic...
The topic of this thesis is random growth processes. These occur naturally in many real world settin...
We consider a model for planar random growth in which growth on the cluster is concentrated in areas...
We consider a family of growth models defined using conformal maps in which the local growth rate is...
We consider a variation of the Hastings-Levitov model HL(0) for random growth in which the growing c...
Planar random growth processes occur widely in the physical world. Examples include diffusion-limite...
We evaluate a strongly regularised version of the Hastings-Levitov model HL$(\alpha)$ for $0\leq \al...
We study a regularized version of Hastings-Levitov planar random growth that models clusters formed ...
We study scaling limits of a family of planar random growth processes in which clusters grow by the ...
We construct and study a stationary version of the Hastings-Levitov$(0)$ model. We prove that, unlik...
We establish some scaling limits for a model of planar aggregation. The model is described by the co...
We consider a model of planar random aggregation from the ALE$(0,\eta)$ family where particles are a...
AbstractThe Hastings–Levitov process HL(α) describes planar random compact subsets by means of rando...
We study the fluctuations of the outer domain of Hastings–Levitov clusters in the small particle lim...
We construct and study a stationary version of the Hastings–Levitov(0)(0) model. We prove that, unli...
We consider a variation of the standard Hastings-Levitov model HL(0), in which growth is anisotropic...
The topic of this thesis is random growth processes. These occur naturally in many real world settin...
We consider a model for planar random growth in which growth on the cluster is concentrated in areas...
We consider a family of growth models defined using conformal maps in which the local growth rate is...
We consider a variation of the Hastings-Levitov model HL(0) for random growth in which the growing c...
Planar random growth processes occur widely in the physical world. Examples include diffusion-limite...
We evaluate a strongly regularised version of the Hastings-Levitov model HL$(\alpha)$ for $0\leq \al...
We study a regularized version of Hastings-Levitov planar random growth that models clusters formed ...
We study scaling limits of a family of planar random growth processes in which clusters grow by the ...
We construct and study a stationary version of the Hastings-Levitov$(0)$ model. We prove that, unlik...
We establish some scaling limits for a model of planar aggregation. The model is described by the co...
We consider a model of planar random aggregation from the ALE$(0,\eta)$ family where particles are a...
AbstractThe Hastings–Levitov process HL(α) describes planar random compact subsets by means of rando...
We study the fluctuations of the outer domain of Hastings–Levitov clusters in the small particle lim...
We construct and study a stationary version of the Hastings–Levitov(0)(0) model. We prove that, unli...