R. Hakl, A. Lomtatidze, and J. \v Sremr
abstract:
In this paper the question on the existence and uniqueness of a constant sign
solution of a periodic type boundary value problem
is studied. More precisely, the nonimprovable
effective sufficient conditions for a linear bounded operator
$\ell:\cabr\to\labr$ are established guaranteeing that the problem
$$
u'(t)=\ell(u)(t)+q(t),\qquad u(a)-\lambda u(b)=c,
$$
where $q\in\labrp$, $\lambda$ $\in\rp$, has a unique solution, and this
solution does not change its sign.
Mathematics Subject Classification: 34K06, 34K10.
Key words and phrases: Linear functional differential equation, periodic type boundary value problem, solvability and unique solvability.