Interface structure in colored dla model
Tchijov V., Nechaev S., Rodriguez-Romo S.
We propose a model for the simultaneous diffusion-limited growth of two clusters Aand where the growth of one cluster screens the growth of the other one. We consider the possibility that the A and ÷ clusters can penetrate into each other in course of their growth in different spatial dimensions and express the conjecture that the A-B boundary is flat in all dimensions. Using an electrostatic analogy, we compute some spatial characteristics of the clusters.