Zdzisław Kamont, Adam Nadolski
Abstract:
We prove that a function of several variables satisfying a functional
differential inequality with unbounded delay can be estimated by a solution of a
suitable initial problem for an ordinary functional differential equation. As a
consequence of the comparison theorem we obtain a Perron-type uniqueness result
and a result on continuous dependence of solutions on given functions for
partial functional differential equations with unbounded delay. We consider
classical solutions on the Haar pyramid.
Keywords:
Maximal solutions, initial problems, unbounded delay, nonlinear estimates of the
Perron type, comparison result.
MSC 2000: 35R10, 34K12