Scaling Properties of the Spread Harmonic Measures

@inproceedings{Grebenkov2004ScalingPO,
  title={Scaling Properties of the Spread Harmonic Measures},
  author={Denis S Grebenkov},
  year={2004}
}
A family of the spread harmonic measures is naturally generated by partially reflected Brownian motion. Their relation to the mixed boundary value problem makes them important to characterize the transfer capacity of irregular interfaces in Laplacian transport processes. This family presents a continuous transition between the harmonic measure (Dirichlet condition) and the Hausdorff measure (Neumann condition). It is found that the scaling properties of the spread harmonic measures on… CONTINUE READING