We consider the following second order differential equation with delayIn this paper we find necessary and sufficient conditions of positivity of Green's functions for this impulsive equation coupled with one or two-point boundary conditions in the form of theorems about differential inequalities. By choosing the test function in these theorems, we obtain simple sufficient conditions. For example, the inequality p i=1 bi(t) 1 4 + r < 2 ω 2 is a basic one, implying negativity of Green's function of two-point problem for this impulsive equation in the case 0 < γi ≤ 1, 0 < δi ≤ 1 for i = 1, . . . , p.
Abstract. We consider the following second order differential equation with delayIn this paper we find sufficient conditions of positivity of Green's functions for this impulsive equation coupled with two-point boundary conditions in the form of theorems about differential inequalities. Choosing the test function in these theorems, we obtain simple sufficient conditions.
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