SSweibull package:stats R Documentation _W_e_i_b_u_l_l _g_r_o_w_t_h _c_u_r_v_e _m_o_d_e_l _D_e_s_c_r_i_p_t_i_o_n: This 'selfStart' model evaluates the Weibull model for growth curve data and its gradient. It has an 'initial' attribute that will evaluate initial estimates of the parameters 'Asym', 'Drop', 'lrc', and 'pwr' for a given set of data. _U_s_a_g_e: SSweibull(x, Asym, Drop, lrc, pwr) _A_r_g_u_m_e_n_t_s: x: a numeric vector of values at which to evaluate the model. Asym: a numeric parameter representing the horizontal asymptote on the right side (very small values of 'x'). Drop: a numeric parameter representing the change from 'Asym' to the 'y' intercept. lrc: a numeric parameter representing the natural logarithm of the rate constant. pwr: a numeric parameter representing the power to which 'x' is raised. _D_e_t_a_i_l_s: This model is a generalization of the 'SSasymp' model in that it reduces to 'SSasymp' when 'pwr' is unity. _V_a_l_u_e: a numeric vector of the same length as 'x'. It is the value of the expression 'Asym-Drop*exp(-exp(lrc)*x^pwr)'. If all of the arguments 'Asym', 'Drop', 'lrc', and 'pwr' are names of objects, the gradient matrix with respect to these names is attached as an attribute named 'gradient'. _A_u_t_h_o_r(_s): Douglas Bates _R_e_f_e_r_e_n_c_e_s: Ratkowsky, David A. (1983), _Nonlinear Regression Modeling_, Dekker. (section 4.4.5) _S_e_e _A_l_s_o: 'nls', 'selfStart', 'SSasymp' _E_x_a_m_p_l_e_s: Chick.6 <- subset(ChickWeight, (Chick == 6) & (Time > 0)) SSweibull(Chick.6$Time, 160, 115, -5.5, 2.5 ) # response only Asym <- 160; Drop <- 115; lrc <- -5.5; pwr <- 2.5 SSweibull(Chick.6$Time, Asym, Drop, lrc, pwr) # response and gradient getInitial(weight ~ SSweibull(Time, Asym, Drop, lrc, pwr), data = Chick.6) ## Initial values are in fact the converged values fm1 <- nls(weight ~ SSweibull(Time, Asym, Drop, lrc, pwr), data = Chick.6) summary(fm1)