Article
MSC:
35B40,
35B45,
35J25,
35J40,
35J75,
35Q99 | MR 4022159 | Zbl 07144725 | DOI: 10.21136/AM.2019.0057-19
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Keywords:
biharmonic operator; elliptic problems; nonsmooth boundaries; uniform singularity estimates; Sobolev spaces
biharmonic operator; elliptic problems; nonsmooth boundaries; uniform singularity estimates; Sobolev spaces
Summary:
We propose, on a model case, a new approach to classical results obtained by V. A. Kondrat'ev (1967), P. Grisvard (1972), (1985), H. Blum and R. Rannacher (1980), V. G. Maz'ya (1980), (1984), (1992), S. Nicaise (1994a), (1994b), (1994c), M. Dauge (1988), (1990), (1993a), (1993b), A. Tami (2016), and others, describing the singularities of solutions of an elliptic problem on a polygonal domain of the plane that may appear near a corner. It provides a more precise description of how the solutions decompose, puts into evidence the analogy of such decompositions with standard Taylor expansions, and gives uniform estimates with respect to the angle parameter. This last property allows the treatment of families of elliptic problems on families of open sets.
References:
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