Home  >  Article  >  Backend Development  >  python中黄金分割法实现方法

python中黄金分割法实现方法

WBOY
WBOYOriginal
2016-06-10 15:13:072633browse

本文实例讲述了python中黄金分割法实现方法。分享给大家供大家参考。具体实现方法如下:

''' a,b = bracket(f,xStart,h)
  Finds the brackets (a,b) of a minimum point of the
  user-supplied scalar function f(x).
  The search starts downhill from xStart with a step
  length h.
  x,fMin = search(f,a,b,tol=1.0e-6)
  Golden section method for determining x that minimizes
  the user-supplied scalar function f(x).
  The minimum must be bracketed in (a,b).
'''    
from math import log, ceil
def bracket(f,x1,h):
  c = 1.618033989 
  f1 = f(x1)
  x2 = x1 + h; f2 = f(x2)
 # Determine downhill direction and change sign of h if needed
  if f2 > f1:
    h = -h
    x2 = x1 + h; f2 = f(x2)
   # Check if minimum between x1 - h and x1 + h
    if f2 > f1: return x2,x1 - h 
 # Search loop
  for i in range (100):  
    h = c*h
    x3 = x2 + h; f3 = f(x3)
    if f3 > f2: return x1,x3
    x1 = x2; x2 = x3
    f1 = f2; f2 = f3
  print "Bracket did not find a mimimum"    
def search(f,a,b,tol=1.0e-9):
  nIter = int(ceil(-2.078087*log(tol/abs(b-a)))) # Eq. (10.4)
  R = 0.618033989
  C = 1.0 - R
 # First telescoping
  x1 = R*a + C*b; x2 = C*a + R*b
  f1 = f(x1); f2 = f(x2)
 # Main loop
  for i in range(nIter):
    if f1 > f2:
      a = x1
      x1 = x2; f1 = f2
      x2 = C*a + R*b; f2 = f(x2)
    else:
      b = x2
      x2 = x1; f2 = f1
      x1 = R*a + C*b; f1 = f(x1)
  if f1 < f2: return x1,f1
  else: return x2,f2

希望本文所述对大家的Python程序设计有所帮助。

Statement:
The content of this article is voluntarily contributed by netizens, and the copyright belongs to the original author. This site does not assume corresponding legal responsibility. If you find any content suspected of plagiarism or infringement, please contact admin@php.cn