Mathematica Bohemica (Jul 2021)
The periodic problem for the second order integro-differential equations with distributed deviation
Abstract
We study the question of the unique solvability of the periodic type problem for the second order linear integro-differential equation with distributed argument deviation u"(t)=p_0(t)u(t)+\int_0^{\omega}p(t,s)u(\tau(t,s)) {\rm d}s+ q(t), and on the basis of the obtained results by the a priori boundedness principle we prove the new results on the solvability of periodic type problem for the second order nonlinear functional differential equations, which are close to the linear integro-differential equations. The proved results are optimal in some sense.
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