Fractal snowflake domain diffusion with boundary and interior drifts
We study a (elliptic measurable coefficients) diffusion in the classical snowflake domain in the situation when there are
diffusion and drift terms not only in the interior but also on the fractal boundary, which is a union of three copies of
the classical Koch curve. In this example we can combine the fractal membrane analysis, the vector analysis for local
Dirichlet forms and quasilinear PDE and SPDE on fractals, non-symmetric Dirichlet forms, and analysis of Lipschitz