On the Sobolev problem in the complete scale of Banach spaces
Abstract
In a bounded domainG with boundary ∂G that consists of components of different dimensions, we consider an elliptic boundary-value problem in complete scales of Banach spaces. The orders of boundary expressions are arbitrary; they are pseudodifferential along ∂G. We prove the theorem on a complete set of isomorphisms and generalize its application. The results obtained are true for elliptic Sobolev problems with a parameter and parabolic Sobolev problems as well as for systems with the Douglis-Nirenberg structure.
Published
25.09.1999
How to Cite
Los’V. M., and RoitbergY. A. “On the Sobolev Problem in the Complete Scale of Banach Spaces”. Ukrains’kyi Matematychnyi Zhurnal, Vol. 51, no. 9, Sept. 1999, pp. 1181–1192, https://umj.imath.kiev.ua/index.php/umj/article/view/4714.
Issue
Section
Research articles