Polynomial bounds for the solutions of parametric transmission problems on smooth, bounded domains

Abstract

We consider a family (Pω)ω ∈ of elliptic second order differential operators on a domain U0 ⊂ Rm whose coefficients depend on the space variable x ∈ U0 and on ω ∈ , a probability space. We allow the coefficients aij of Pω to have jumps over a fixed interface ⊂ U0 (independent of ω ∈ ). We obtain polynomial in the norms of the coefficients estimates on the norm of the solution uω to the equation Pω uω = f with transmission and mixed boundary conditions (we consider ``sign-changing'' problems as well). In particular, we show that, if f and the coefficients aij are smooth enough and follow a log-normal-type distribution, then the map ω \|uω\|Hk+1(U0) is in Lp(), for all 1 p < ∞. The same is true for the norms of the inverses of the resulting operators. We expect our estimates to be useful in Uncertainty Quantification.