Scenario analysis for programmatic tuberculosis control in Bangladesh: a mathematical modelling study

[1]  E. McBryde,et al.  Modeling drug-resistant tuberculosis amplification rates and intervention strategies in Bangladesh , 2020, PloS one.

[2]  Azizur Rahman,et al.  Cost-effective modeling of the transmission dynamics of malaria: A case study in Bangladesh , 2020 .

[3]  Lei Gao,et al.  Primary drug resistance of mycobacterium tuberculosis in Shandong, China, 2004–2018 , 2019, Respiratory Research.

[4]  S. Brilleman,et al.  Revisiting the Natural History of Pulmonary Tuberculosis: a Bayesian Estimation of Natural Recovery and Mortality rates , 2019, bioRxiv.

[5]  Wei Wang,et al.  Antibiotic resistance: a rundown of a global crisis , 2018, Infection and drug resistance.

[6]  Soyoung Kim,et al.  Mathematical model and intervention strategies for mitigating tuberculosis in the Philippines. , 2018, Journal of theoretical biology.

[7]  Romain Ragonnet,et al.  Modular programming for tuberculosis control, the “AuTuMN” platform , 2017, BMC Infectious Diseases.

[8]  Pauline van den Driessche,et al.  Reproduction numbers of infectious disease models. , 2017 .

[9]  Romain Ragonnet,et al.  Optimally capturing latency dynamics in models of tuberculosis transmission. , 2017, Epidemics.

[10]  E. Oren,et al.  Programmatic Management of Drug-Resistant Tuberculosis: An Updated Research Agenda , 2016, PloS one.

[11]  C. Castillo-Chavez,et al.  A two-strain TB model with multiple latent stages. , 2016, Mathematical biosciences and engineering : MBE.

[12]  D. Okuonghae,et al.  Dynamics of a Mathematical Model for Tuberculosis with Variability in Susceptibility and Disease Progressions Due to Difference in Awareness Level , 2016, Front. Microbiol..

[13]  R. Kumar,et al.  Availability of medicines in public sector health facilities of two North Indian States , 2015, BMC Pharmacology and Toxicology.

[14]  Farai Nyabadza,et al.  Modelling Optimal Control of Cholera in Communities Linked by Migration , 2015, Comput. Math. Methods Medicine.

[15]  A. Bernabé-Ortiz,et al.  Mortality among MDR-TB Cases: Comparison with Drug-Susceptible Tuberculosis and Associated Factors , 2015, PloS one.

[16]  H. Ebbing,et al.  Case Study: Bangladesh , 2015, Sight and Life Magazine: Scaling up Rice Fortification in Asia.

[17]  Emma S McBryde,et al.  Construction of a mathematical model for tuberculosis transmission in highly endemic regions of the Asia-Pacific. , 2014, Journal of theoretical biology.

[18]  B. Mishra,et al.  Mathematical model on pulmonary and multidrug-resistant tuberculosis patients with vaccination , 2014 .

[19]  C. Daley Global scale-up of the programmatic management of multidrug-resistant tuberculosis. , 2014, The Indian journal of tuberculosis.

[20]  Sunmi Lee,et al.  What Does a Mathematical Model Tell About the Impact of Reinfection in Korean Tuberculosis Infection? , 2014, Osong public health and research perspectives.

[21]  J. Amo-Adjei Views of health service providers on obstacles to tuberculosis control in Ghana , 2013, Infectious Diseases of Poverty.

[22]  E. Pontali,et al.  Drug-resistant tuberculosis , 2013, Current opinion in pulmonary medicine.

[23]  S. Ray,et al.  Multidrug-Resistant Tuberculosis Drug Susceptibility and Molecular Diagnostic Testing , 2013, The American journal of the medical sciences.

[24]  D. Okuonghae,et al.  Analysis of a mathematical model for tuberculosis: What could be done to increase case detection. , 2011, Journal of theoretical biology.

[25]  Zhien Ma,et al.  Global stability of two models with incomplete treatment for tuberculosis , 2010 .

[26]  B. Cooper,et al.  The role of mathematical modelling in guiding the science and economics of malaria elimination , 2010, International health.

[27]  Sebastian Bonhoeffer,et al.  Compensation of Fitness Costs and Reversibility of Antibiotic Resistance Mutations , 2010, Antimicrobial Agents and Chemotherapy.

[28]  Ellen Brooks-Pollock,et al.  The Impact of Realistic Age Structure in Simple Models of Tuberculosis Transmission , 2010, PloS one.

[29]  O Diekmann,et al.  The construction of next-generation matrices for compartmental epidemic models , 2010, Journal of The Royal Society Interface.

[30]  C. Bhunu,et al.  Modelling the effects of pre-exposure and post-exposure vaccines in tuberculosis control. , 2008, Journal of theoretical biology.

[31]  S. Niemann,et al.  Risk of acquired drug resistance during short-course directly observed treatment of tuberculosis in an area with high levels of drug resistance. , 2007, Clinical infectious diseases : an official publication of the Infectious Diseases Society of America.

[32]  NAKUL CHITNIS,et al.  Bifurcation Analysis of a Mathematical Model for Malaria Transmission , 2006, SIAM J. Appl. Math..

[33]  L. Wahl,et al.  Perspectives on the basic reproductive ratio , 2005, Journal of The Royal Society Interface.

[34]  M. Bleda,et al.  Determinants of health system delay among confirmed tuberculosis cases in Spain. , 2005, European journal of public health.

[35]  A. Kritski,et al.  Transmission of Mycobacterium tuberculosis to contacts of HIV-infected tuberculosis patients. , 2001, American journal of respiratory and critical care medicine.

[36]  W. Schaffner,et al.  Management of an Outbreak of Tuberculosis in a Small Community , 1996, Annals of Internal Medicine.