Abstract
We prove that a large class of parabolic final value problems is well posed. This results via explicit Hilbert spaces that characterise the data yielding existence, uniqueness and stability of solutions. This data space is the graph normed domain of an unbounded operator, which represents a new compatibility condition pertinent for final value problems. The framework is that of evolution equations for Lax–Milgram operators in vector distribution spaces. The final value heat equation on a smooth open set is also covered, and for non-zero Dirichlet data, a non-trivial extension of the compatibility condition is obtained by addition of an improper Bochner integral.
| Translated title of the contribution | On parabolic final value problems and well-posedness |
|---|---|
| Original language | French |
| Journal | Comptes Rendus Mathematique |
| Volume | 356 |
| Issue number | 3 |
| Pages (from-to) | 301-305 |
| Number of pages | 5 |
| ISSN | 1631-073X |
| DOIs | |
| Publication status | Published - 2018 |