The growth model of Baranyi and Roberts (1995) written as analytical solution of the system of differential equations.
Arguments
- time
vector of time steps (independent variable).
- parms
named parameter vector of the Baranyi growth model with:
y0initial value of abundance,mumaxmaximum growth rate (1/time),Kcarrying capacity (max. abundance),h0parameter specifying the initial physiological state of organisms (e.g. cells) and in consequence the lag phase (h0 = max growth rate * lag phase).
Details
The version of the equation used in this package has the following form:
$$A = time + 1/mumax * log(exp(-mumax * time) + exp(-h0) - exp(-mumax * time - h0))$$ $$log(y) = log(y0) + mumax * A - log(1 + (exp(mumax * A) - 1) / exp(log(K) - log(y0)))$$
References
Baranyi, J. and Roberts, T. A. (1994). A dynamic approach to predicting bacterial growth in food. International Journal of Food Microbiology, 23, 277-294.
Baranyi, J. and Roberts, T.A. (1995). Mathematics of predictive microbiology. International Journal of Food Microbiology, 26, 199-218.
See also
Other growth models:
grow_exponential(),
grow_gompertz(),
grow_gompertz2(),
grow_huang(),
grow_logistic(),
grow_richards(),
growthmodel,
ode_genlogistic(),
ode_twostep()
