|
会议链接:https://us06web.zoom.us/j/4120194771 入会密码:mcm1234
We consider the obstacle problem for a nonlocal elliptic operator, like the integral fractional Laplacian of order $s \in (0,1)$. We derive regularity results in weighted Sobolev spaces, where the weight is a power of the distance to the boundary. These are then used to obtain optimal error estimates in the energy norm.
Next, we consider the case of an obstacle problem where the operator is a combination of a fractional Laplacian and a regular Laplacian. We derive regularity results in classical Sobolev spaces, and use these to obtain error estimates.
Finally, we consider a two-scale discretization of the operator, which is monotone and naturally leads to max-norm error estimates for the linear problem. We extend these to the obstacle problem and indicate how, from these, free boundary estimates can be obtained; provided a nondegeneracy condition takes place. As an application of this result, we sketch ongoing work regarding the numerical approximation of a class of fully nonlinear, convex, integrodifferential operators.
This presentation is based on several works in collaboration with: A. Bonito (Texas A&M), J.P. Borthagaray (Montevideo), W. Lei (SISSA), R.H. Nochetto (UMD), and C. Torres (UMD).
| 
