A boundary jumps phenomenon in the integral boundary value problem for singularly perturbed differential equations

A boundary jumps phenomenon in the integral boundary value problem for singularly perturbed differential equations

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The article is devoted to the study of the asymptotic behavior of solving an integral boundary value problem for a third - order linear differential equation with a small parameter for two higher derivatives, provided that the roots of the "additional characteristic equation" have opposite signs.In click here the work are constructed the fundamental system of solutions, boundary functions for singularly perturbed homogeneous differential equation and are provided their asymptotic representations.An analytical formula of solution for a given singularly perturbed integral boundary value problem is obtained.Theorem about asymptotic estimates of solution is click here proved.

For a singularly perturbed integral boundary value problem, the growth of the solution and its derivatives at the boundary points of this segment is obtained when the small parameter tends to zero.It is established that the solution of a singularly perturbed integral boundary value problem has initial jumps at both ends of this segment.