English

Final value problems for parabolic differential equations and their well-posedness

Analysis of PDEs 2018-05-15 v2

Abstract

This article concerns the basic understanding of parabolic final value problems, and a large class of such problems is proved to be well posed. The clarification is obtained via explicit Hilbert spaces that characterise the possible data, giving existence, uniqueness and stability of the corresponding solutions. The data space is given as the graph normed domain of an unbounded operator occurring naturally in the theory. It induces a new compatibility condition, which relies on the fact, shown here, that analytic semigroups always are invertible in the class of closed operators. The general set-up is evolution equations for Lax--Milgram operators in spaces of vector distributions. As a main example, the final value problem of the heat equation on a smooth open set is treated, and non-zero Dirichlet data are shown to require a non-trivial extension of the compatibility condition by addition of an improper Bochner integral.

Keywords

Cite

@article{arxiv.1707.02136,
  title  = {Final value problems for parabolic differential equations and their well-posedness},
  author = {Ann-Eva Christensen and Jon Johnsen},
  journal= {arXiv preprint arXiv:1707.02136},
  year   = {2018}
}

Comments

39 pages. Revised version, with minor improvements. Essentially identical to the accepted version, which appeared in Axioms on 9 May 2018

R2 v1 2026-06-22T20:40:36.720Z