Existence of solutions for discontinuous functional equations and elliptic boundary-value problems.
On non-absolute functional Volterra integral equations and impulsive differential equations in ordered Banach spaces.
Rapid convergence of approximate solutions for first order nonlinear boundary value problems.
Equations containing locally Henstock-Kurzweil integrable functions
A fixed point theorem in ordered spaces and a recently proved monotone convergence theorem are applied to derive existence and comparison results for solutions of a functional integral equation of Volterra type and a functional impulsive Cauchy problem in an ordered Banach space. A novel feature is that equations contain locally Henstock-Kurzweil integrable functions.
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