Elliptic B. Lawruk boundary value problems in the extended Sobolev scale
Abstract
In the extended Sobolev scale, we investigate a class of elliptic problems with additional unknown functions in boundary conditions, which is introduced by B.~Lawruk. This scale consists of all Hilbert spaces that are interpolation spaces for pairs of Sobolev inner-product spaces and, moreover, admits a constructive description in terms of H\"ormander spaces. We prove a theorem on the Fredholm property of the bounded operators corresponding to these problems on the extended Sobolev scale and a theorem on local regularity of their solutions in H\"ormander spaces. We find sufficient conditions under which the generalized derivatives (of a given order) of the solutions are continuous.
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Published
2015-06-25
How to Cite
Chepurukhina, I. S. (2015). Elliptic B. Lawruk boundary value problems in the extended Sobolev scale. Transactions of Institute of Mathematics, the NAS of Ukraine, 12(2), 338–374. Retrieved from https://trim.imath.kiev.ua/index.php/trim/article/view/204
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Research papers