On the conditions of solvability and the resolvent of a second-order deferential boundary operator in a space of vector functions
Abstract
A boundary differential operator generated by the Sturm-Liouville differential expression with bounded operator potential and nonlocal boundary conditions is considered. The conditions for a considered operator to be a Fredholm and solvable operator are established and its resolvent is constructed.Downloads
Published
25.04.1995
Issue
Section
Research articles
