In this paper, motivated by a problem arising in random homogenization theory, we initiate the study of uniform estimates for the fractional penalized obstacle problem, $ Delta^{s}u^{epsilon} = beta_{epsilon} (u^{epsilon})$. In particular we consider the penalized boundary obstacle problem, $s = frac{1}{2}$, and obtain sharp estimates for the solution independent of the penalizing parameter $epsilon$. This is a generalization of a result due to H. Brezis and D. Kinderlehrer.
Download