基于Python fminunc 的替代方法

基于Python fminunc 的替代方法,第1张

基于Python fminunc 的替代方法

最近闲着没事,想把coursera上斯坦福ML课程里面的练习,用Python来实现一下,一是加深ML的基础,二是熟悉一下numpy,matplotlib,scipy这些库。

在EX2中,优化theta使用了matlab里面的fminunc函数,不知道Python里面如何实现。搜索之后,发现stackflow上有人提到用scipy库里面的minimize函数来替代。我尝试直接调用我的costfunction和grad,程序报错,提示(3,)和(100,1)dim维度不等,gradient vector不对之类的,试了N多次后,终于发现问题何在。。

首先来看看使用np.info(minimize)查看函数的介绍,传入的参数有:

fun : callable
 The objective function to be minimized.
 
  ``fun(x, *args) -> float``
 
 where x is an 1-D array with shape (n,) and `args`
 is a tuple of the fixed parameters needed to completely
 specify the function.
x0 : ndarray, shape (n,)
 Initial guess. Array of real elements of size (n,),
 where 'n' is the number of independent variables.
args : tuple, optional
 Extra arguments passed to the objective function and its
 derivatives (`fun`, `jac` and `hess` functions).
method : str or callable, optional
 Type of solver. Should be one of
 
  - 'Nelder-Mead' :ref:`(see here) `
  - 'Powell'  :ref:`(see here) `
  - 'CG'   :ref:`(see here) `
  - 'BFGS'  :ref:`(see here) `
  - 'Newton-CG' :ref:`(see here) `
  - 'L-BFGS-B' :ref:`(see here) `
  - 'TNC'   :ref:`(see here) `
  - 'COBYLA'  :ref:`(see here) `
  - 'SLSQP'  :ref:`(see here) `
  - 'trust-constr':ref:`(see here) `
  - 'dogleg'  :ref:`(see here) `
  - 'trust-ncg' :ref:`(see here) `
  - 'trust-exact' :ref:`(see here) `
  - 'trust-krylov' :ref:`(see here) `
  - custom - a callable object (added in version 0.14.0),
   see below for description.
 
 If not given, chosen to be one of ``BFGS``, ``L-BFGS-B``, ``SLSQP``,
 depending if the problem has constraints or bounds.
jac : {callable, '2-point', '3-point', 'cs', bool}, optional
 Method for computing the gradient vector. only for CG, BFGS,
 Newton-CG, L-BFGS-B, TNC, SLSQP, dogleg, trust-ncg, trust-krylov,
 trust-exact and trust-constr. If it is a callable, it should be a
 function that returns the gradient vector:
 
  ``jac(x, *args) -> array_like, shape (n,)``
 
 where x is an array with shape (n,) and `args` is a tuple with
 the fixed parameters. Alternatively, the keywords
 {'2-point', '3-point', 'cs'} select a finite
 difference scheme for numerical estimation of the gradient. Options
 '3-point' and 'cs' are available only to 'trust-constr'.
 If `jac` is a Boolean and is True, `fun` is assumed to return the
 gradient along with the objective function. If False, the gradient
 will be estimated using '2-point' finite difference estimation.

需要注意的是fun关键词参数里面的函数,需要把优化的theta放在第一个位置,X,y,放到后面。并且,theta在传入的时候一定要是一个一维shape(n,)的数组,不然会出错。

然后jac是梯度,这里的有两个地方要注意,第一个是传入的theta依然要是一个一维shape(n,),第二个是返回的梯度也要是一个一维shape(n,)的数组。

总之,关键在于传入的theta一定要是一个1D shape(n,)的,不然就不行。我之前为了方便已经把theta塑造成了一个(n,1)的列向量,导致使用minimize时会报错。所以,学会用help看说明可谓是相当重要啊~

import numpy as np
import pandas as pd
import scipy.optimize as op
 
def LoadData(filename):
 data=pd.read_csv(filename,header=None)
 data=np.array(data)
 return data
 
def ReshapeData(data):
 m=np.size(data,0)
 X=data[:,0:2]
 Y=data[:,2]
 Y=Y.reshape((m,1))
 return X,Y
 
def InitData(X):
 m,n=X.shape
 initial_theta = np.zeros(n + 1)
 Vecones = np.ones((m, 1))
 X = np.column_stack((VecOnes, X))
 return X,initial_theta
 
def sigmoid(x):
 z=1/(1+np.exp(-x))
 return z
 
def costFunction(theta,X,Y):
 m=X.shape[0]
 J = (-np.dot(Y.T, np.log(sigmoid(X.dot(theta)))) - 
   np.dot((1 - Y).T, np.log(1 - sigmoid(X.dot(theta))))) / m
 return J
 
def gradient(theta,X,Y):
 m,n=X.shape
 theta=theta.reshape((n,1))
 grad=np.dot(X.T,sigmoid(X.dot(theta))-Y)/m
 return grad.flatten()
 
if __name__=='__main__':
 data = LoadData('ex2data1csv.csv')
 X, Y = ReshapeData(data)
 X, initial_theta = InitData(X)
 result = op.minimize(fun=costFunction, x0=initial_theta, args=(X, Y), method='TNC', jac=gradient)
 print(result)

最后结果如下,符合MATLAB里面用fminunc优化的结果(fminunc:cost:0.203,theta:-25.161,0.206,0.201)

  fun: array([0.2034977])
  jac: array([8.95038682e-09, 8.16149951e-08, 4.74505693e-07])
 message: 'Local minimum reached (|pg| ~= 0)'
 nfev: 36
  nit: 17
 status: 0
 success: True
  x: array([-25.16131858, 0.20623159, 0.20147149])

此外,由于知道cost在0.203左右,所以我用最笨的梯度下降试了一下,由于后面实在是太慢了,所以设置while J>0.21,循环了大概13W次。。可见,使用集成好的优化算法是多么重要。。。还有,在以前的理解中,如果一个学习速率不合适,J会一直发散,但是昨天的实验发现,有的速率开始会发散,后面还是会收敛。

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