A Discrete Host Commensal Species with Limited Resources and Mortality Rate for the Commensal
Journal Title: INTERNATIONAL JOURNAL OF MATHEMATICS TRENDS AND TECHNOLOGY - Year 2013, Vol 4, Issue 1
Abstract
This paper deals with an investigation on a Discrete Host-Commensal species with limited resources and mortality rate for the commensal. The model comprises of a commensal (S1), host (S2) that would benefit S1, without getting effected either positively or adversely. The model is characterized by a couple of first order non-linear ordinary differential equations. All possible equilibrium points are identified based on the model equations at two stages and criteria for their stability are discussed.
Authors and Affiliations
R. Srilatha1 , B. Ravindra Reddy2 , N. Ch. Pattabhiramacharyulu
Fuzzy Transportation Problem Using Improved Fuzzy Russells Method
In this paper, we investigate the new idea of optimal solution of squared triangular and trapezoidal fuzzy number via fuzzy russal’s method. This method is a modification of yager’s ranking method. A new algorithm is inv...
Transmission Mechanisms of the Inequality-Growth Relationship
This paper contributes to the debate over the relationship between income inequality and economic growth by developing a comprehensive description of the mechanisms and the models proposed in the literature over th...
Stability Analysis of two Competitive Interacting Species with Optimal and Bionomic Harvesting of the Second Species
This paper deals with two species competitive model with optimal harvesting of the second species under bionomic conditions. The model is characterized by a pair of first order non-linear ordinary differential equa...
On Some Generalized Well Known Results of Fixed Point Theorems of T- Contraction Mappings in Cone Metric Spaces
In this paper, we obtain sufficient conditions for the existence of a common fixed point of T- Contraction mapping in the setting on complete cone metric spaces. Our results generalized well known recent result of Garg a...
Contra g#p-Continuous Functions
A function f: (X,τ) → (Y,σ) is called g#p-continuous[2] if f-1(V) is g#p-closed in(X,τ) for every closed set V in (Y,σ). The notion of contra continuity was introduced and investigated by Dontchev[6]. In this paper we in...