NORMAL BOUNDARY VALUE PROBLEMS FOR DIFFERENTIAL EQUATIONS OF HIGHER ORDER

Authors

F. G. MAKSUDOV
Z. I. ISMAILOV

Abstract

In this work the arbitrary order differential operator expression of the form \imath (u) = \frac{\partial u (t)}{\partial t^n}+Au(t), where A is a bounded normal operator in the Hilbert Space H is considered in the Hilbert Space of vector functions L_2(H(0,1)). This paper describes all normal boundary value problem for the indicated diferential expression in terms of abstnract boundary conditions and determines a connection with other typea of boundary value problems.

DOI

-

First Page

141

Last Page

151

Recommended Citation

MAKSUDOV, F. G, & ISMAILOV, Z. I (1996). NORMAL BOUNDARY VALUE PROBLEMS FOR DIFFERENTIAL EQUATIONS OF HIGHER ORDER. Turkish Journal of Mathematics 20 (2): 141-151. https://doi.org/-