Simulation models for laboratory populations of Callosobruchus chinensis and Callosobruchus maculatus Stored products of plant origin, beetles

[1]  A. J. Lotka,et al.  Elements of Physical Biology. , 1925, Nature.

[2]  P. Sharpe,et al.  Distribution model of organism development times. , 1977, Journal of theoretical biology.

[3]  R. Howe,et al.  Some laboratory observations on the rates of development, mortality and oviposition of several species of Bruchidae breeding in stored pulses. , 1964 .

[4]  R. May,et al.  Stability and Complexity in Model Ecosystems , 1976, IEEE Transactions on Systems, Man, and Cybernetics.

[5]  M. Hassell,et al.  Discrete time models for two-species competition. , 1976, Theoretical population biology.

[6]  T. Bellows The Descriptive Properties of Some Models for Density Dependence , 1981 .

[7]  V. Volterra Variations and Fluctuations of the Number of Individuals in Animal Species living together , 1928 .

[8]  T. Bellows,et al.  ANALYTICAL MODELS FOR LABORATORY POPULATIONS OF CALLOSOBRUCHUS CHINENSIS AND C. MACULATUS (COLEOPTERA, BRUCHIDAE) , 1982 .

[9]  M. Birley The Estimation of Insect Density and Instar Survivorship Functions from Census Data , 1977 .

[10]  Robert M. May,et al.  Time delays, density-dependence and single-species oscillations , 1974 .

[11]  A. C. Crombie On Intraspecific and Interspecific Competition in Larvae of Graminivorous Insects , 1944 .

[12]  M. Kendall,et al.  The advanced theory of statistics , 1945 .

[13]  R. Mitchell The Evolution of Oviposition Tactics in the Bean Weevil, Callosobruchus maculatus (F.) , 1975 .

[14]  N. Draper,et al.  Applied Regression Analysis , 1966 .

[15]  A. J. Lotka Elements of Physical Biology. , 1925, Nature.

[16]  J. Maynard Smith,et al.  The Stability of Predator‐Prey Systems , 1973 .

[17]  Michael P. Hassell,et al.  DENSITY-DEPENDENCE IN SINGLE-SPECIES POPULATIONS , 1975 .