creators_name: EKA SULISTIA NINGSIH, 1517031035
creators_id: -
type: other
datestamp: 2022-04-13 05:01:00
lastmod: 2022-04-13 05:01:00
metadata_visibility: show
title: ANALISIS KESTABILAN MODEL EPIDEMIK SIR DENGAN
PENGARUH VAKSIN
ispublished: pub
subjects: 510
full_text_status: restricted
abstract: The effect of vaccination can help in reducing the spread of disease. A way to
facilitate controlling the spread of disease is by using mathematical models. The
model is the SIR epidemic model (Susceptible, Infected, Recovered). In this
study, the SIR epidemic model produced two equilibrium points. The equilibrium
points are a disease-free and endemic equilibrium point. The analysis produces the
reproduction ratio of the vaccine. Next, simulations for each case describe the
behavior and stability of the equilibrium point.
Keyword :Vaccination, Mathematical Model, Stability
date: 2019
date_type: published
publisher: FAKULTAS MATEMATIKA DAN ILMU PENGETAHUAN ALAM
place_of_pub: UNIVERSITAS LAMPUNG
citation:   EKA SULISTIA NINGSIH, 1517031035  (2019) ANALISIS KESTABILAN MODEL EPIDEMIK SIR DENGAN PENGARUH VAKSIN.  FAKULTAS MATEMATIKA DAN ILMU PENGETAHUAN ALAM, UNIVERSITAS LAMPUNG.     
document_url: http://digilib.unila.ac.id/59265/1/ABSTRAK.pdf
document_url: http://digilib.unila.ac.id/59265/2/SKRIPSI%20FULL.pdf
document_url: http://digilib.unila.ac.id/59265/3/SKRIPSI%20TANPA%20BAB%20PEMBAHASAN.pdf