`a`
Mathematical Biosciences and Engineering (MBE)
 

An aggregate stochastic model incorporating individual dynamics for predation movements of anelosimus studiosus
Pages: 585 - 607, Issue 3, June 2015

doi:10.3934/mbe.2015.12.585      Abstract        References        Full text (1983.6K)           Related Articles

Alex John Quijano - Department of Mathematics & Statistics, East Tennessee State University, Johnson City, TN, 37614, United States (email)
Michele L. Joyner - Department of Mathematics & Statistics, East Tennessee State University, Johnson City, TN, 37614, United States (email)
Edith Seier - Department of Mathematics & Statistics, East Tennessee State University, Johnson City, TN, 37614, United States (email)
Nathaniel Hancock - Department of Biological Sciences, East Tennessee State University, Johnson City, TN, 37614, United States (email)
Michael Largent - Department of Biological Sciences, East Tennessee State University, Johnson City, TN, 37614, United States (email)
Thomas C. Jones - Department of Biological Sciences, East Tennessee State University, Johnson City, TN, 37614, United States (email)

1 H. Banks, S. Hu and W. Clayton, Modeling and Inverse Problems in the Presence of Uncertainty, CRC Press, Boca Raton, 2014.       
2 D. R. Billinger, H. K. Preisler, A. A. Ager, J. G. Kie and B. S. Stewart, Modelling Movements of Free-Ranging Animals, Technical Report 610, Department of Statistics, University of California, Berkeley, 2001.
3 M. Davidian and D. M. Giltinan, Nonlinear models for repeated measurement data: An overview and update, Journal of Agricultural, Biological, and Environmental Statistics, 8 (2003), 387-419.
4 B. Douglas, Tracker: Video Analysis and Modeling Tool, Tracker version 4.80, Copyright(c), 2013, URL http://www.cabrillo.edu/~dbrown/tracker.
5 R. F. Foelix, The Biology of Spiders, 3rd edition, Oxford University Press, 2011.
6 L. Grinstead, J. N. Pruitt, V. Settepani and T. Bilde, Individual personalities shape task differentiation in a social spider, Proceedings of the Royal Society B, 280 (2013).
7 D. Halliday and R. Resnick, Fundamentals of Physics, John Wiley & Sons, Inc., New York, 1988.
8 P. Hoel and R. Jessen, Basic Statistics for Business and Economics, John Wiley & Sons, Inc., New York, 1971.
9 T. C. Jones and P. G. Parker, Costs and benefits of foraging associated with delayed dispersal in the spider anelosimus studiosus (araneae: Theridiidae), Journal of Arachnology, 28 (2000), 61-69.
10 T. C. Jones and P. G. Parker, Delayed dispersal benefits both mother and offspring in the cooperative spider anelosimus studiosus (araneae: Theridiidae), Behavioral Ecology, 13 (2002), 142-148.
11 M. Joyner, C. Ross, C. Watts and T. Jones, A stochastic simulation model for anelosimus studiosus during prey capture: A case study for determination of optimal spacing, Mathematical Biosciences and Engineering, 11 (2014), 1411-1429.
12 R. Larson and D. Falvo, Elementary Linear Algebra, 6th edition, Brooks/Cole, Belmont CA, 2010.
13 S. A. Naftilan, Transmission of vibrations in funnel and sheet spider webs, Biological Macromolecules, 24 (1999), 289-293.
14 J. N. Pruitt, S. E. Riechert and T. C. Jones, Behavioural syndromes and their fitness consequences in a socially polymorphic spider, anelosimus studiosus, Animal Behaviour, 76 (2008), 871-879.
15 R Core Team, R: A Language and Environment for Statistical Computing, R Foundation for Statistical Computing, Vienna, Austria, 2013, URL http://www.R-project.org/.
16 P. E. Smouse, S. Focardi, P. R. Moorcroft, J. G. Kie, J. D. Forester and J. M. Morales, Stochastic modelling of animal movement, Phi.l Trans.R. Soc. B., 365 (2010), 2201-2211.

Go to top