Summary. In many applied problems of control, optimization, system theory, theoretical and construction mechanics, for problems with strings and nods structures, oscillation theory, theory of elasticity and plasticity, mechanical problems connected with fracture dynamics and shock waves, the main instrument for study these problems is a theory of high order ordinary differential equations. This methodology is also applied for studying mathematical models in graph theory with different partitioning based on differential equations. Such equations are used for theoretical foundation of mathematical models but also for constructing numerical methods and computer algorithms. These models are studied with use of Green function method. In the paper first necessary theoretical information is included on Green function method for multi point boundary-value problems. The main equation is discussed, notions of multi-point boundary conditions, boundary functionals, degenerate and non-degenerate problems, fundamental matrix of solutions are introduced. In the main part the problem to study is formulated in terms of shocks and deformations in boundary conditions. After that the main results are formulated. In theorem 1 conditions for existence and uniqueness of solutions are proved. In theorem 2 conditions are proved for strict positivity and equal measureness for a pair of solutions. In theorem 3 existence and estimates are proved for the least eigenvalue, spectral properties and positivity of eigenfunctions. In theorem 4 the weighted positivity is proved for the Green function. Some possible applications are considered for a signal theory and transmutation operators.

two-point boundary-value problems, Green function, graph theory

1. Dikareva E.V. Green function method in mathematical models for two point boundary-value problems. Novye informatsionnye tekhnologii v avtomatizirovannykh sistemakh [New Informatics Technologies For Automated Systems. Materials of 18th scientific-practical seminar]. Moscow, M.V. Keldysh Institute of Applied Mathematics of the Russian Academy of Sciences, 2015, p. 226-235. (In Russ.).

2. Kiselev E.A., Minin L.A., Novikov I.Ya., Sitnik S.M. On Riesz constants for some systems of integer shifts. Matematicheskie zametki. [Math. surveys], 2014, vol. 96, no. 2, pp. 239-250. (In Russ.).

3. Zhuravlev M.V., Kiselev E.A., Minin L.A., Sitnik S. M. Jacobi theta-functions and systems of integral shifts of Gaussian functions. Journal of Mathematical Sciences, Springer, 2011, vol. 173, no. 2, pp. 231-241.

4. Sitnik S.M. Buschman-Erdelyi transmutations, classification and applications. In the Book: Analytic Methods Of Analysis And Differential Equations: AMADE 2012. (Edited by M.V.Dubatovskaya, S.V.Rogosin). Cambridge, Cambridge Scientific Publishers, 2013. pp. 171-201.

5. Nedoshivina A.I., Sitnik S.M. Applications of geometrical algorithms for point localization to modelling and data compression for video surveillance problems. Vestnik VGTU. [Bulletin of Voronezh State Technical University], 2013, vol. 9, no. 4, pp. 108-111. (In Russ.).

6. Pevnyi A.B., Sitnik S.M. Strictly positively defined functions, inequalities of M.G. Krein and E.A. Gorin. Novye informatsionnye tekhnologii v avtomatizirovannykh sistemakh [New Informatics Technologies For Automated Systems. Materials of 18th scientific-practical seminar]. Moscow, M.V. Keldysh Institute of Applied Mathematics of the Russian Academy of Sciences, 2015, pp. 247-254. (In Russ.).

7. Sitnik S.M., Timashov A.S. Numerical analysis of finite dimensional mathematical model for a problem of quadratic exponential interpolation. Nauchnye vedomosti Belgorodskogo gosudarstvennogo universiteta. [Belgorod State University Scientific Bulletin. Mathematics & Physics], 2013, no. 19 (162), issue 32, pp. 184-186. (In Russ.).

8. Sitnik S.M., Timashov A.S. Applications of exponential approximations by integer shifts of the Gaussian functions. Vestnik VGUIT. [Bulletin of Voronezh State University of Engineering Technologies], 2013, no. 2 (56), pp. 90-94. (In Russ.).