Tabea Tscherpel: Stability properties of the L^2 -projection

Vortragender/Speaker: Tabea Tscherpel (TU Darmstadt)
Ansprechpartner/Contact: Prof. Dr. Oliver Sander
Videostream (BBB): (on request)

Titel/Title:
Stability properties of the L² -projection

Zusammenfassung/Abstract:
The L²-projection mapping to Lagrange finite element spaces is an importanttool in numerical analysis. Its Sobolev stability is known to be key to discrete stability and quasi-optimality estimates for parabolic problems. For adaptively generated meshes the proof of Sobolev stability is challenging and requires conditions on how strongly the mesh size varies.

We present stability properties under certain conditions on the polynomial degree, on the space dimension and on the mesh grading. In particular, the L²-projection is W^1,2-stable for any polynomial degree, for any space dimension smaller than 7 on meshes generated by the newest vertex bisection.

This is joint work with Lars Diening (Bielefeld University) and Johannes Storn (Universität Leipzig).