Publication detail

On a nonlocal boundary value problem for first order linear functional differential equations

OPLUŠTIL, Z. LOMTATIDZE, A. ŠREMR, J.

Original Title

On a nonlocal boundary value problem for first order linear functional differential equations

Type

journal article - other

Language

English

Original Abstract

Efficient sufficient conditions are established for the solvability and unique solvability of the boundary value problem for first order linear functional differential equations. u'(t)=l(u)(t)+q(t) u(a)=h(u)+c, where l is a linear bounded operator, h is a linear bounded functionals, q is a Lebesgue integrable function and c is a real number.

Keywords

Boundary value problem, functional differential equations

Authors

OPLUŠTIL, Z.; LOMTATIDZE, A.; ŠREMR, J.

Released

20. 9. 2007

Publisher

Publishing House GCI

ISBN

1512-0015

Periodical

Memoirs Diff. Equat. Math. Phys

Year of study

2007

Number

41

State

Georgia

Pages from

69

Pages to

85

Pages count

16

BibTex

@article{BUT43999,
  author="Zdeněk {Opluštil} and Aleksandre {Lomtatidze} and Jiří {Šremr}",
  title="On a nonlocal boundary value problem for first order linear functional differential equations",
  journal="Memoirs Diff. Equat.  Math. Phys",
  year="2007",
  volume="2007",
  number="41",
  pages="69--85",
  issn="1512-0015"
}