Homogenization of diffusion processes with singular drifts and potentials via unfolding method

Abstract

This work is concerned with homogenization problems for elliptic equations of the type \[ cases Lδ uδ + λ uδ = fδ in \;\; D, \\ \;\, u = 0 \, on \;\; ∂ D, cases \] where δ > 0, λ ∈ R, D is a bounded open set in Rd, and fδ ∈ H-1(D). The operator Lδ u = - div ( Aδ ∇ u + Cδ u ) + Bδ ∇ u +kδ u involved uniformly bounded diffusion coefficients Aδ, where drifts Bδ, Cδ, and potential kδ are possibly unbounded. An application to homogenization of the corresponding diffusion processes is also discussed.