I'm relatively new to Python and am trying to implement the Gauss-Newton method, specifically the example on the Wikipedia page for it (Gauss–Newton algorithm, 3 example). The following is what I have done so far:
import scipy import numpy as np import math import scipy.misc from matplotlib import pyplot as plt, cm, colors S = [0.038,0.194,.425,.626,1.253,2.500,3.740] rate = [0.050,0.127,0.094,0.2122,0.2729,0.2665,0.3317] iterations = 5 rows = 7 cols = 2 B = np.matrix([[.9],[.2]]) # original guess for B Jf = np.zeros((rows,cols)) # Jacobian matrix from r r = np.zeros((rows,1)) #r equations def model(Vmax, Km, Sval): return ((vmax * Sval) / (Km + Sval)) def partialDerB1(B2,xi): return round(-(xi/(B2+xi)),10) def partialDerB2(B1,B2,xi): return round(((B1*xi)/((B2+xi)*(B2+xi))),10) def residual(x,y,B1,B2): return (y - ((B1*x)/(B2+x))) for i in range(0,iterations): sumOfResid=0 #calculate Jr and r for this iteration. for j in range(0,rows): r[j,0] = residual(S[j],rate[j],B,B) sumOfResid = sumOfResid + (r[j,0] * r[j,0]) Jf[j,0] = partialDerB1(B,S[j]) Jf[j,1] = partialDerB2(B,B,S[j]) Jft = np.transpose(Jf) B = B + np.dot((np.dot(Jft,Jf)**-1),(np.dot(Jft,r))) print B
The sum of the squares of the residuals increases rather than tends towards 0 at each iteration and my resulting
B vector increases.
I'm having trouble understanding where my problem is, and any help would be appreciated.