We have introduced a discrete time prey-predator model with Generalized Holling type interaction. Stability nature of the fixed points of the model are determined analytically. Phase diagrams are drawn after solving the system numerically. Bifurcation analysis is done with respect to various parameters of the system. It is shown that for modeling of non-chaotic prey predator ecological systems with Generalized Holling type interaction may be more useful for better prediction and analysis.
%0 Journal Article
%1 noauthororeditor
%A Roy1, Prodip
%A and Nabakumar Ghosh2,
%D 2013
%J International Journal of Information Technology, Modeling and Computing (IJITMC)
%K Bifurcation Chaotic Discrete Generalized Holling Stable coexistence. interaction model motion time type
%N 4
%P 01-11
%R 10.5121/ijitmc.2013.1402
%T DISCRETE TIME PREY-PREDATOR MODEL WITH GENERALIZED HOLLING TYPE INTERACTION
%U http://airccse.org/journal/ijitmc/papers/1413ijitmc02.pdf
%V 1
%X We have introduced a discrete time prey-predator model with Generalized Holling type interaction. Stability nature of the fixed points of the model are determined analytically. Phase diagrams are drawn after solving the system numerically. Bifurcation analysis is done with respect to various parameters of the system. It is shown that for modeling of non-chaotic prey predator ecological systems with Generalized Holling type interaction may be more useful for better prediction and analysis.
@article{noauthororeditor,
abstract = {We have introduced a discrete time prey-predator model with Generalized Holling type interaction. Stability nature of the fixed points of the model are determined analytically. Phase diagrams are drawn after solving the system numerically. Bifurcation analysis is done with respect to various parameters of the system. It is shown that for modeling of non-chaotic prey predator ecological systems with Generalized Holling type interaction may be more useful for better prediction and analysis.},
added-at = {2018-09-13T13:11:23.000+0200},
author = {Roy1, Prodip and and Nabakumar Ghosh2},
biburl = {https://www.bibsonomy.org/bibtex/25b565d09bf124a793ef53057846425f0/alexafedrica},
doi = {10.5121/ijitmc.2013.1402},
interhash = {56179e324bb94a0af7cfe8085c7f739a},
intrahash = {5b565d09bf124a793ef53057846425f0},
journal = {International Journal of Information Technology, Modeling and Computing (IJITMC)},
keywords = {Bifurcation Chaotic Discrete Generalized Holling Stable coexistence. interaction model motion time type},
month = {November},
number = 4,
pages = {01-11},
timestamp = {2018-09-13T13:11:23.000+0200},
title = {DISCRETE TIME PREY-PREDATOR MODEL WITH GENERALIZED HOLLING TYPE INTERACTION},
url = {http://airccse.org/journal/ijitmc/papers/1413ijitmc02.pdf},
volume = 1,
year = 2013
}