@article{et. al_2020, title={STABILITY RESULTS FOR THE RUBEOLA MODEL}, volume={29}, url={http://sersc.org/journals/index.php/IJAST/article/view/3330}, abstractNote={<p><em>The main objective of this study is to determine the dynamics of the Rubeola model. This work exhibits the equilibrium point of the Rubeola model with the stability results by using the Jacobian matrix to calculate the differential equation system. This model displays the different level explicit which is reflected in the associated interpretation and will help to interpret the dynamics of Rubeola and set strategies on how to increase vaccination among infected person. From the analysis, perception to the theoretical and the mathematical illustration of spread and contamination patterns has been obtained. The study will act as a basis for farther exploration of Rubeola and other related diseases. This method is used to calculate the saddle point. The analytic method used to describe the differential equations seems to have a limited use in the enlarge system which leads to the mathematical impediments.</em></p&gt;}, number={2}, journal={International Journal of Advanced Science and Technology}, author={et. al, S. Priyadharsini}, year={2020}, month={Jan.}, pages={1125 - 1132} }