INTERNATIONAL JOURNAL OF RESEARCH IN ADVANCE ENGINEERING

This mathematical model used Routh–Hurwitz Stability Criterion to provide the critical evaluation of the epidemics of Swine Flu. We introduce the Jacobian to determine the effect of variations in the potential of the epidemic for their prediction. Stability of infectious diease through this model is depend upon eigen value λi >,=,< 0; i=1,2,3 and found the given system marginally stable.

Compartmental Model, SIR Model, Swine Flu

Prasenjit Das, Nurul Huda Gazi, Kalyan Das and Debasis Mukherjee, “Stability Analysis of Swine Flu Transmission - A Mathematical Approach”, Issue 3 (1), 2014, Computational and Mathematical Biology.

Numerical Data collected from Indira Gandhi Medical College, Shimla, January, 2013 to December, 2013.

Meghna R. Sebastian, Rakesh Lodha and S.K. Kabra, “Swine Origin Influenza (Swine Flu)”, Volume 76, August, 2009, Indian Journal of Pediatrics.

Feng Lin; Kumar Muthu raman; Mark Lawley “An optimal control theory approach to non-pharmaceutical interventions”, 10:32, 2010, BMC Infectious Diseases

Herbert W. Hethcote, “The Mathematics of Infectious Diseases”, Vol. 42, No. 4, pp. 599-653, 2000, SlAM REVIEW

Dr. V.H. Badshah, Pradeep Porwal, Dr. Vishwas Tiwari, “Mathematical Modeling and Role of Dynamics in Epidemiology”; Vol 5, Number 1 (2013), pp. 1-10; IJCSM

D. Aldila, N. Nuraini and E. Soewono, “Optimal Control Problem in Preventing of Swine Flu Disease Transmission”, Vol. 8, 2014, no. 71, 3501 – 3512; AMS

Shyam S. Pattnaik, “Swine influenza inspired optimization algorithm and its application to multimodal function optimization and noise removal”, September 2012, Vol. 1, No.1; Artificial Intelligence Research

Mahendra Singh and Savitri Sharma, “An epidemiological study of recent outbreak of Influenza A H1N1 (Swine Flu) in Western Rajasthan region of India”, 3(2): 48 – 52; 2013; JMAS

Kayla Henneman, Dan Van Peursem, Victor C. Huber, “Mathematical modeling of influenza and a secondary bacterial infection”; Issue 1, Volume 10, January 2013; WSEAS TRANSACTIONS on BIOLOGY and BIOMEDICINE

Ross Beckley, “Modeling epidemics with differential equation”, June 21, 2013, Tennessee State University

Sheikh Taslim Ali, A S Kadi, S R Avaradi, S P Hiremath, “Stochastic Modelling: An Approach to Quantify the Transmission Intensity of Pandemic Influenza (H1N1) in Maharashtra”, Vol. 2, No. 2, 2013, GJMEDPH

Ellen Brooks-Pollock and Ken T. D. Eames, “Pigs didn’t Fly, but Swine Flu”, 2009, London School of Hygiene and Tropical Medicine, Keppel Street, London.