English

A drift homogenization problem revisited

Analysis of PDEs 2010-06-17 v1

Abstract

This paper revisits a homogenization problem studied by L. Tartar related to a tridimensional Stokes equation perturbed by a drift (connected to the Coriolis force). Here, a scalar equation and a two-dimensional Stokes equation with a L2L^2-bounded oscillating drift are considered. Under higher integrability conditions the Tartar approach based on the oscillations test functions method applies and leads to a limit equation with an extra zero-order term. When the drift is only assumed to be equi-integrable in L2L^2, the same limit behaviour is obtained. However, the lack of integrability makes difficult the direct use of the Tartar method. A new method in the context of homogenization theory is proposed. It is based on a parametrix of the Laplace operator which permits to write the solution of the equation as a solution of a fixed point problem, and to use truncated functions even in the vector-valued case. On the other hand, two counter-examples which induce different homogenized zero-order terms actually show the optimality of the equi-integrability assumption.

Cite

@article{arxiv.1006.3296,
  title  = {A drift homogenization problem revisited},
  author = {Marc Briane and Patrick Gérard},
  journal= {arXiv preprint arXiv:1006.3296},
  year   = {2010}
}

Comments

31 pages

R2 v1 2026-06-21T15:37:19.044Z