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Mathematical Analysis Of An Sir Disease Model With Non-Constant Transmission Rate, Emma Bollinger, Tayler Valdez, Swarup Ghosh, Sunil Giri
Mathematical Analysis Of An Sir Disease Model With Non-Constant Transmission Rate, Emma Bollinger, Tayler Valdez, Swarup Ghosh, Sunil Giri
Student Research
- Epidemiology: A branch of medicine that studies causes, transmission, and control methods of diseases at the population level.
- Mathematical epidemiology deals with creating a model for a disease through the study of incidence and distribution of the disease throughout a population.
- Here, we have examined the behavior of a measles-like disease[2] that is characterized by a non-constant transmission rate.
01. Animal Science, Southwestern Oklahoma State University
01. Animal Science, Southwestern Oklahoma State University
Oklahoma Research Day Abstracts
No abstract provided.
03. Botany, Southwestern Oklahoma State University
03. Botany, Southwestern Oklahoma State University
Oklahoma Research Day Abstracts
No abstract provided.
02. Biology, Southwestern Oklahoma State University
02. Biology, Southwestern Oklahoma State University
Oklahoma Research Day Abstracts
No abstract provided.
04. Chemistry, Southwestern Oklahoma State University
04. Chemistry, Southwestern Oklahoma State University
Oklahoma Research Day Abstracts
No abstract provided.
06. Criminal Justice, Southwestern Oklahoma State University
06. Criminal Justice, Southwestern Oklahoma State University
Oklahoma Research Day Abstracts
No abstract provided.
05. Computer Science, Southwestern Oklahoma State University
05. Computer Science, Southwestern Oklahoma State University
Oklahoma Research Day Abstracts
No abstract provided.
08. Environmental Science, Southwestern Oklahoma State University
08. Environmental Science, Southwestern Oklahoma State University
Oklahoma Research Day Abstracts
No abstract provided.
09. Forensic Science, Southwestern Oklahoma State University
09. Forensic Science, Southwestern Oklahoma State University
Oklahoma Research Day Abstracts
No abstract provided.
10. Genetics, Southwestern Oklahoma State University
10. Genetics, Southwestern Oklahoma State University
Oklahoma Research Day Abstracts
No abstract provided.
11. Kinesiology, Southwestern Oklahoma State University
11. Kinesiology, Southwestern Oklahoma State University
Oklahoma Research Day Abstracts
No abstract provided.
13. Pharmacy, Southwestern Oklahoma State University
13. Pharmacy, Southwestern Oklahoma State University
Oklahoma Research Day Abstracts
No abstract provided.
12. Mathematics, Southwestern Oklahoma State University
12. Mathematics, Southwestern Oklahoma State University
Oklahoma Research Day Abstracts
No abstract provided.
16. Statistics, Southwestern Oklahoma State University
16. Statistics, Southwestern Oklahoma State University
Oklahoma Research Day Abstracts
No abstract provided.
17. Zoology, Southwestern Oklahoma State University
17. Zoology, Southwestern Oklahoma State University
Oklahoma Research Day Abstracts
No abstract provided.
15. Psychology, Southwestern Oklahoma State University
15. Psychology, Southwestern Oklahoma State University
Oklahoma Research Day Abstracts
No abstract provided.
07. Engineering, Southwestern Oklahoma State University
07. Engineering, Southwestern Oklahoma State University
Oklahoma Research Day Abstracts
No abstract provided.
14. Physics, Southwestern Oklahoma State University
14. Physics, Southwestern Oklahoma State University
Oklahoma Research Day Abstracts
No abstract provided.
Isolated Point Theorems For Uniform Algebras On Smooth Manifolds, Swarup Ghosh
Isolated Point Theorems For Uniform Algebras On Smooth Manifolds, Swarup Ghosh
Faculty Articles & Research
In 1957, Andrew Gleason conjectured that if A is a uniform algebra on its maximal ideal space X and every point of X is a one-point Gleason part for A, then A must contain all continuous functions on X. Gleason’s conjecture was disproved by Brian Cole in 1968. In this paper, we establish a strengthened form of Gleason’s conjecture for uniform algebras generated by real-analytic functions on compact subsets of real-analytic three-dimensional manifolds-with-boundary.
01. Animal Science, Southwestern Oklahoma State University
01. Animal Science, Southwestern Oklahoma State University
Oklahoma Research Day Abstracts
No abstract provided.
02. Biology, Southwestern Oklahoma State University
02. Biology, Southwestern Oklahoma State University
Oklahoma Research Day Abstracts
No abstract provided.
03. Botany, Southwestern Oklahoma State University
03. Botany, Southwestern Oklahoma State University
Oklahoma Research Day Abstracts
No abstract provided.
04. Chemistry, Southwestern Oklahoma State University
04. Chemistry, Southwestern Oklahoma State University
Oklahoma Research Day Abstracts
No abstract provided.
06. Criminal Justice, Southwestern Oklahoma State University
06. Criminal Justice, Southwestern Oklahoma State University
Oklahoma Research Day Abstracts
No abstract provided.
09. Forensic Science, Southwestern Oklahoma State University
09. Forensic Science, Southwestern Oklahoma State University
Oklahoma Research Day Abstracts
No abstract provided.
07. Engineering, Southwestern Oklahoma State University
07. Engineering, Southwestern Oklahoma State University
Oklahoma Research Day Abstracts
No abstract provided.
10. Genetics, Southwestern Oklahoma State University
10. Genetics, Southwestern Oklahoma State University
Oklahoma Research Day Abstracts
No abstract provided.
11. Kinesiology, Southwestern Oklahoma State University
11. Kinesiology, Southwestern Oklahoma State University
Oklahoma Research Day Abstracts
No abstract provided.
12. Mathematics, Southwestern Oklahoma State University
12. Mathematics, Southwestern Oklahoma State University
Oklahoma Research Day Abstracts
No abstract provided.
13. Pharmacy, Southwestern Oklahoma State University
13. Pharmacy, Southwestern Oklahoma State University
Oklahoma Research Day Abstracts
No abstract provided.