Technical Report

 

Coexistence of Competing Species with a Directly Transmitted Pathogen Public Deposited

Downloadable Content

Download PDF
https://ir.library.oregonstate.edu/concern/technical_reports/tq57nr52b

Descriptions

Attribute NameValues
Creator
Abstract
  • In this paper we consider models of two competing species that are both affected by a pathogen which is transmitted directly. We consider both mass action as well as frequency incidence models of disease spread, and Lotka-Volterra competition. Our aim is to address the interaction between competition and disease dynamics. We do this by presenting previously known results along with new results in a unified manner that stresses the role of the basic reproduction number as well as the relative strengths of intra- versus inter-specific competition for both species. For both types of disease models we compute the basic reproduction numbers. For the mass action case we compute all the equilibria except infected coexistence, and analyze the equilibria for their stability. To analyze infected coexistence, we consider a simplified ecologically relevant model and prove a conjecture made in [18,9] about the stability of the infected coexistence equilibrium. The model with frequency incidence is shown to have a unique endemic equilibrium whose existence and stability depends on the value of the basic reproduction number.
Resource Type
Date Available
Date Issued
Academic Affiliation
Series
Keyword
Rights Statement
Funding Statement (additional comments about funding)
  • The first author is partially supported by a grant from the NSF, proposal number DMS-0811223. The second author is supported by an NSF IGERT graduate fellowship (NSF award 0333257) in the Ecosystem Informatics IGERT program at Oregon State University.
Language
Replaces
Additional Information
  • description.provenance : Made available in DSpace on 2010-10-03T07:20:54Z (GMT). No. of bitstreams: 1 BokilManorePaper1.pdf: 644706 bytes, checksum: c350fccd52d11992137d44519963c54c (MD5)
  • description.provenance : Submitted by Vrushali Bokil (bokilv@math.oregonstate.edu) on 2010-10-03T07:17:51Z No. of bitstreams: 1 BokilManorePaper1.pdf: 644706 bytes, checksum: c350fccd52d11992137d44519963c54c (MD5)
  • description.provenance : Approved for entry into archive by Vrushali Bokil(bokilv@math.oregonstate.edu) on 2010-10-03T07:20:54Z (GMT) No. of bitstreams: 1 BokilManorePaper1.pdf: 644706 bytes, checksum: c350fccd52d11992137d44519963c54c (MD5)

Relationships

Parents:

This work has no parents.

Items