@inproceedings{88dfc08c173e46579241b25fe2571539,
title = "A mathematical model for the spread of COVID-19 with unmonitored individual asymptomatic, vaccinations and returning home",
abstract = "This paper presents a mathematical model based on the influence of unmonitored asymptomatic individuals, vaccinations and individuals returning home to the spread of COVID 19. The concept used is that individual populations moves in 3 regions with each region having 1 interface or 1 connecting route. Individual movement is expressed by a weight function which in modeling use the Kernel density function in the normal group. The mathematical model obtained is in the form of a System of Integro-Partial Differential Equations consisting of 3 regional sub-models and an entire regional system model. Leipzig constant analysis was carried out in order to obtain model validation that was suitable for the phenomenon that occurred.",
author = "Hariyanto and Chairul Imron and Suhud Wahyudi and Nur Asiyah",
note = "Publisher Copyright: {\textcopyright} 2022 Author(s).; 7th International Conference on Mathematics: Pure, Applied and Computation: , ICoMPAC 2021 ; Conference date: 02-10-2021",
year = "2022",
month = dec,
day = "19",
doi = "10.1063/5.0115068",
language = "English",
series = "AIP Conference Proceedings",
publisher = "American Institute of Physics Inc.",
editor = "Mufid, {Muhammad Syifa�ul} and Dieky Adzkiya",
booktitle = "7th International Conference on Mathematics - Pure, Applied and Computation",
}