TY - JOUR
AU - Pukach, P.Ya.
AU - Vovk, M.I.
AU - Pukach, P.P.
PY - 2022/11/22
Y2 - 2024/02/26
TI - ON ONE NONLINEAR MATHEMATICAL MODEL OF BLOOD CIRCULATION WITH THE VESSEL WALLS REACTION WITHIN THE HEREDITARY THEORY
JF - PRECARPATHIAN BULLETIN OF THE SHEVCHENKO SCIENTIFIC SOCIETY Number
JA - Number
VL -
IS - 17(64)
SE - Mathematics and Mechanics
DO - 10.31471/2304-7399-2022-17(64)-31-43
UR - https://pvntsh.nung.edu.ua/index.php/number/article/view/1807
SP - 31-43
AB - <p>The research demonstrates sufficient conditions of the existence and uniqueness for the solution in the oscillation mathematical model of the blood flow under nonlinear dissipative forces action within the theory of hereditary tube with biofactor. The obtained qualitative results advocate the application of Galerkin method to the above-mentioned problem. These results facilitated the application of different (explicit and implicit) numerical methods in further studies of the dynamical characteristics of solutions in the considered oscillation mathematical models. Numerical integration of the movement equations by Runge-Kutta 4th order method and Geer 2nd order method in a model case within this research enabled the estimation of the influence of different physical and mechanical factors on the amplitude and frequency of the oscillation process. The use of hybrid methods for the oscillation modeling in the nonlinear isotropic elastic environment on the<br>example of a vessel enabled the formulation of the equation of an objectâ€™s mechanical state based on energy approaches and the theory of mechanical fields in the continuous environments.</p>
ER -