We found a match
Your institution may have access to this item. Find your institution then sign in to continue.
- Title
ANALYSIS THE SOLUTIONS OF THE DIFFERENTIAL NON-LINEAR EQUATIONS DESCRIBING THE INFORMATION SPREADING PROCESS WITH JUMP DISCONTINUITY.
- Authors
NAKONECHNYI, O. G.; ZINKO, P. M.; SHEVCHUK, I. M.
- Abstract
In this paper, we introduce a mathematical model of spreading any type of information. The model has the form of a system of nonlinear differential equations with non-stationary parameters. We have suggested the explicit solutions of the system differential non-linear equations describing the information spreading process. Special case of this model with jump discontinuity is considered. The numerical experiments demonstrated the practical meaning of the offered results. The results can be useful for algorithm development for estimation of dynamic of information spreading process.
- Subjects
NONLINEAR equations; INFORMATION sharing; JUMP processes; GRAPH theory; SET theory
- Publication
Matematychni Studii, 2019, Vol 51, Issue 2, p159
- ISSN
1027-4634
- Publication type
Article
- DOI
10.15330/ms.51.2.159-167